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semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) dimension of family of curves; exceptional Weierstrass points; reducible Hurwitz schemes Diaz, S., Moduli of curves with two exceptional Weierstrass points, J. Differ. Geom., 20, 471-478, (1984)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative algebraic geometry; coarse moduli schemes; Morita equivalence classes; Deligne-Mumford curves D. Chan and C. Ingalls, Non-commutative coordinate rings and stacks, \textit{Proc. London Math. Soc.,}\textbf{88} (2004), 63-88.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quantum algebras; coordinate rings; quantum Grassmannians; twistings; dihedral groups; torus-invariant prime ideals; totally nonnegative Grassmannians; totally positive Grassmannians	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quadratic forms; $u$-invariant; power series fields; function fields of curves; orderings of fields; patching of fields Scheiderer, Claus: The u-invariant of one-dimensional function fields over real power series fields, Arch. math. (Basel) 93, No. 3, 245-251 (2009)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) positive characteristic; uniform approximation of ideals; regular variety; Abhyankar valuation; test ideals; Frobenius morphism; Noetherian domain; graded system	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) vector bundles on projective spaces; moduli spaces of curves; unirationality; space curves	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) irreducible components of Hurwitz spaces; finite coverings of projective curves; semigroups over groups Kulikov, Vik.S., Kharlamov, V.M.: Covering semigroups. Izv. Math. \textbf{77}(3), 594-626 (2013)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projective embeddings of abelian varieties; Products of elliptic curves Auffarth, R., A note on Galois embeddings of abelian varieties, Manuscr. Math., 154, 279-284, (2017)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) coverings of curves; projective curve; automorphism group; linear fractional transformation; algebraic function field; finite Galois extension; Galois group	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) $p$-torsion points of elliptic curves; Galois representations; quadratic number field; semi-stable elliptic curves [13] A. Kraus, $Courbes elliptiques semi-stables et corps quadratiques$, Journal of Number Theory 60, (1996), 245-253. &MR 14 \| &Zbl 0865.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) universal algebraic geometry; representations of Lie algebras; automorphic equivalence Shestakov, I; Tsurkov, A, Automorphic equivalence of the representations of Lie algebras, Algebra Discret. Math., 15, 96-126, (2013)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of stable maps from curves to projective space; arithmetic genus; geometric genus; singularities R. Pandharipande, The canonical class of $\({\overline{M}}_{0, n}({ P}^{r}, d)$\) and enumerative geometry. Int. Math. Res. Not. 4, 173-186 (1997)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projective space; geometry; twin building; groups of Chevally type; long root subgroup; amalgam R. Gramlich, On Graphs, Geometries, and Groups of Lie Type, Ph.D. thesis, Technische Universiteit Eindhoven, 2002.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) graded rings of modular forms; Siegel paramodular group; Satake compactification; quotient variety Ibukiyama, T., Onodera, F.: On the graded ring of modular forms of the Siegel paramodular group of level 2. Abh. Math. Semin. Univ. Hamb. 67, 297--305 (1997)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quadratic form; Witt ring; fundamental ideal; Pfister form; Witt index; higher Witt indices; generic splitting; height of a quadratic form; stable birational equivalence; Chow motif; Tate motif; Rost motif; homogeneous variety; Rost's nilpotence theorem; Steenrod operation; motivic equivalence Kahn, B., \textit{formes quadratiques et cycles algébriques [d'après rost, Voevodsky, vishik, karpenko ...], exposé bourbaki no. 941}, Astérisque, 307, 113-163, (2006)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Mumford classes; moduli space of $n$-pointed stable curves; combinatorical cycles; quadratic differentials E. Arbarello and M. Cornalba, Combinatorial and algebro-geometric cohomology classes on the moduli spaces of curves, J. Algebraic Geom. 5 (1996), 705-749.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) algebraic geometry; uniformly bounded p-torsion of elliptic curves; order of group of p-torsion points Manin, Ju. I., The \textit{p}-torsion of elliptic curves is uniformly bounded, Izv. Akad. Nauk SSSR Ser. Mat., 33, 459-465, (1969)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) approximable algebras; section rings; projective varieties; big bundles; Weil divisors	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) compactification of the space parametrizing twisted cubic curves; enumerating twisted cubics	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of genus $g$ curves $M_{g}$; principally polarized abelian varieties of dimension $g$; Siegel space; holomorphic sectional curvature of $M_{g}$; Schiffer variation; Kähler form of the Siegel metric Colombo, E., Frediani, P.: Siegel metric and curvature of the moduli space of curves. Trans. Am. Math. Soc. 362(3), 1231--1246 (2010)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Hilbert scheme of lines; quadratic manifolds; second fundamental form; projective extensions Russo, F.: Lines on projective varieties and applications. Rend. Circ. Mat. Palermo 61, 47--64 (2012)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Veronese variety; Normal rational curve; Nucleus; Pascal's triangle; Multinomial coefficients; survey; nuclei of Veronese varieties; invariant subspaces of normal rational curves Havlicek H (2003) Veronese varieties over fields with non-zero characteristic: a survey. Discrete Math 267:159--173	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative curves; orbit algebra; concentrated tubes; noncommutative multiplicity; graded factorial domain D. Kussin, \textit{Memoirs of the American Mathematical Society. Vol. 201: Noncommutative curves of genus zero: related to finite dimensional algebras}, AMS Press, Providence U.S.A. (2009).	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of curves; $\kappa$ classes; $\psi$ classes; Witten conjecture; enumerative geometry; intersection theory	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) nef cone; pseudoeffective cone; semistability; cone of curves; fibre product of projective bundle over a curve	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) group actions on schemes; Euler characteristics; homogeneous coordinate rings; Riemann-Roch theorems; Grothendieck groups Bleher, F.; Chinburg, T., Galois structure of homogeneous coordinate rings, Trans. Amer. Math. Soc., 360, 6269-6301, (2008)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) algebraic geometry; symmetric products of curves; semistable degeneration; homotopy groups	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) free groups; quasi-quadratic equations; algebraic geometry over groups; model theory; quasivarieties; irreducible components; definability; elementary theories; coordinate groups; finitely generated groups; universal equivalences O. Kharlampovich and A. Myasnikov, ''Algebraic geometry over free groups: Lifting solutions into generic points,'' Contemp. Math., 378, 213--318 (2005), arXiv:math.GR/0407110.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) decomposition of Cremona transformation; projective equivalence of plane curves; complement of plane curve Yoshihara H.: On open algebraic surfaces \$\$\{$\backslash$mathbb\{P\}\^\{2\} - C\}\$\$ . Math. Ann. 268, 43--57 (1984)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) anabelian geometry; moduli space of curves; Grothendieck conjecture; hyperbolic polycurve; configuration space	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) varieties of modules; projective varieties; Grassmannian varieties; radical layerings of modules; finite-dimensional algebras; finite-dimensional representations; path algebras of quivers modulo relations; irreducible components of parameterizing varieties Huisgen-Zimmermann, B.: A hierarchy of parametrizing varieties for representations, in ''Rings, Modules and Representations'' (N.V. Dung, et al., eds.), Contemp. Math. \textbf{480}, 207-239 (2009)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) maximal genus of curves in projective 3-space Laurent Gruson and Christian Peskine, Postulation des courbes gauches, Algebraic geometry --- open problems (Ravello, 1982) Lecture Notes in Math., vol. 997, Springer, Berlin, 1983, pp. 218 -- 227 (French).	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) cocycle twists; noncommutative geometry; Sklyanin algebras Davies, Andrew, Cocycle twists of 4-dimensional Sklyanin algebras, J. Algebra, 457, 323-360, (2016)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) regular algebras; Noetherian Artin-Schelter regular connected graded algebras; global dimension; AS regular algebras; quantum projective space D.-M. Lu, J. H. Palmieri, Q.-S. Wu, and J. J. Zhang, ''Regular algebras of dimension 4 and their A -Extalgebras,'' Duke Math. J. 137(3), 537--584 (2007).	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Noetherian graded rings; noncommutative projective geometry; deformations; twisted homogeneous coordinate rings J.~T. Stafford and M. van~den Bergh, \emph{Noncommutative curves and noncommutative surfaces}, Bull. Amer. Math. Soc. (N.S.) \textbf{38} (2001), no.~2, 171--216. \MR{1816070}	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative regular rings; cyclic quotient singularities; rational double points; rings of invariants; local dualities; dualizing complexes; Gorenstein singularities; Cohen-Macaulay singularities Chan, D.: Noncommutative rational double points. J. algebra 232, 725-766 (2000)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projectively simple rings; twisted homogeneous coordinate rings; noncommutative projective algebraic geometry; graded algebras; Artin-Schelter regular algebras; ample line bundles; Abelian varieties; Gelfand-Kirillov dimension Z. Reichstein, D. Rogalski, and J. J. Zhang, \textit{Projectively simple rings}, Adv. Math., 203:2 (2006), 365--407. MR2227726	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Noetherian hereditary abelian categories; Serre duality; saturation property; quivers; projective curves; graded rings; almost split sequences; Auslander-Reiten triangles; derived categories Reiten, I.; Van den Bergh, M., Noetherian hereditary abelian categories satisfying Serre duality, \textit{J. Am. Math. Soc.}, 15, 295-366, (2002)	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Azumaya algebra; order; non-commutative projective geometry; $m$-point; dubbed fat point Chan, D.: Twisted rings and moduli stacks of ''fat'' point modules in non-commutative projective geometry, Adv. math. 229, No. 4, 2184-2209 (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) smooth projective varieties; flag varieties; Miyaoka's semipositivity theorem; cotangent bundle; rational surfaces; divisorial contractions; fibrations; crystalline differential operators; étale fundamental group; semistability; reflexives sheaves; semipositive sheaves; uniruled varieties; Riemann-Hilbert correspondence; stable Higgs bundle; Chern classes; flat connections; Artin's criterion of contractibility; Kodaira dimension; Hirzebruch surface; canonical divisor; surfaces of general type; Barlow's surfaces; del Pezzo surfaces; Fano three-folds	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) $K3$ surfaces; rational points; Zariski dense F. Izadi, K. Nabardi, A note on diophantine equation $A^4+D^4=2(B^4+C^4)$	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) genus 2; explicit equations; Selmer group; two-covering; Jacobian; Kummer surface Flynn, E. Victor; Testa, Damiano; Van Luijk, Ronald: Two-coverings of Jacobians of curves of genus 2. Proc. lond. Math. soc. (3) 104, No. 2, 387-429 (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) decidability; separating semialgebraic sets	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) surfaces in projetive 3-space; isolated singularities; rational double points Gallarati, D, Superficie algebriche con molti punti singolari isolati, Bull. Math. Soc. Sci. Math. Roumanie, 55, 249-274, (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) secant variety; embedded join Simis, A., Ulrich, B.: On the ideal of an embedded join. J. Algebra 226, 1--14 (2000)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) $F$-blowups; $F$-pure surface; $F$-regular surface; rational double points; simple elliptic singularities \beginbarticle \bauthor\binitsN. \bsnmHara, \bauthor\binitsT. \bsnmSawada and \bauthor\binitsT. \bsnmYasuda, \batitle$F$-blowups of normal surface singularities, \bjtitleAlgebra Number Theory \bvolume7 (\byear2013), page 733-\blpage763. \endbarticle \OrigBibText N. Hara, T. Sawada and T. Yasuda, $F$-blowups of normal surface singularities, Algebra Number Theory 7 (2013), 733-763. \endOrigBibText \bptokstructpyb \endbibitem	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) higher secant variety; homogeneous ideal; symbolic power; rational normal curve Catalano-Johnson, M. L.: The homogeneous ideal of higher secant varieties. J. pure appl. Algebra 158, 123-129 (2001)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) families of singular rational curves; partial resolution of singularities	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) fibration; hyperquadrics Kachi, Y., Sato E.: Segre's Reflexivity and an Inductive Characterization of Hyperquadrics. Mem. Am. Math. Soc., 160, 763 (2002)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Łojasiewics inequality; Hilbert Nullstellensatz; Cayley-Chow form Brownawell, W. D.: Distance to common zeros and lower bounds for polynomials, , 51-60 (1992)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) rational components; Fano $n$-folds; connected curve; unirational varieties; rational connectedness; deformation theory; R. C. threefolds J. Kollár, Y. Miyaoka and S. Mori, Rationally connected varieties, J. Algebraic Geom. 1 (1992), no. 3, 429-448.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) AH cohomology; DGA; minimal model; $K(\pi,1)$-conjecture; motivic cohomology; absolute Hodge cohomology Wenger, T.: Massey products in Deligne-cohomology. PhD thesis, Münster University (2000)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) very ample line bundle; adjoint linear system; multiplier ideals L. Ein, \textit{Adjoint linear systems}, in: \textit{Current Topics in Complex Algebraic Geometry}, MSRI Publications, 1995, pp. 87-95.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) very ample line bundle; adjoint bundles; projective normality	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) extensions of formal groups; extensions of algebraic groups; Witt vectors; Frobenius endomorphism [SS] Sekiguchi, T., Suwa, N.: A note on extensions of algebraic and formal groups I. Math. Z.206, 567--575 (1991)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) complex superspace; superstack; Moduli superstack; supersymmetric curves; Kuranishi family	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Symmetries of surfaces Gromadzki G.: On Singerman symmetries of a class of Belyi Riemann surfaces. J. Pure Appl. Algebra 213, 1905--1910 (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) smoothness; lexicographic point; Hilbert scheme; JFM 53.0104.01; Hilbert polynomial A. Reeves - M. Stillman, Smoothness of the lexicographic point. J. Algebraic Geom., 6 (2) (1997), pp. 235-246. Zbl0924.14004 MR1489114	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) moduli spaces; equivariant Euler characteristic; orbifold Euler characteristic DOI: 10.1016/j.aim.2013.10.003	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) conics; curve theory	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) algebraic surfaces; algebraic curves	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) rationality of moduli space of curves of genus 2; rationality of moduli space of nodal cubics	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) group invariants; retract rational; Galois extensions; approximation property; finite rank; transcendental extension; Noether's problem; survey David J. Saltman,Groups Acting on Fields: Noether's Problem, Contemp. Mathematics43 (1985), 267--277	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) parabola; fourth order curves; nodes; doublepoints	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) integral intersection homology; weighted projective spaces; pseudo-lens spaces; torsion	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) algebraic stack; Hodge class Yamaki K.: Cornalba-Harris equality for semistable hyperelliptic curves in positive characteristic. Asian J. Math. 8(3), 409--426 (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) characterization of finite group of polynomial automorphisms; algebraic compactification Furushima, M.: Finite groups of polynomial automorphisms in ? n . Tohoku Math. J.35, 415-424 (1983)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) complements of an arrangement of hyperplanes; Coxeter arrangements	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) generic projections; generic singularities; local defining ideal	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) black holes in string theory; D-branes Govindarajan S 2011 BKM Lie superalgebras from counting twisted CHL dyons \textit{J. High Energy Phys.}JHEP05(2011) 089	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) localized schemes; determinants; fraction rings	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Samuel Boissière and Marc A. Nieper-Wißkirchen, Universal formulas for characteristic classes on the Hilbert schemes of points on surfaces, J. Algebra 315 (2007), no. 2, 924 -- 953.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Hurwitz-Hodge integrals; orbifold Hurwitz numbers; cut-and-join equation; Laplace transformation	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) J.-X. Cai, Degree of the canonical map of a Georenstein $3$-fold of general type, Proc. Amer. Math. Soc. 136 (2008), no. 5, 1565--1574.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Giambelli's formulas; quantum equivariant Schubert calculus; factorial Schur functions L.C. Mihalcea, \textit{Giambelli formulae for the equivariant quantum cohomology of the Grassmannian}, \textit{Trans. AMS}\textbf{360} (2008) 2285 [math/0506335].	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) real reductive group; admissible representation; multiplicity; hyperfunction; unitary representation; spherical variety; symmetric space Kashiwara, M.: On the maximally overdetermined system of linear differential equations. I. Publ. Res. Inst. Math. Sci. \textbf{10}, 563-579 (1974/75)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Singularities; Geometry; Topology; Sapporo (Japan); Proceedings	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) trivial extension; braid group action; spherical twist; quiver; derived category; Koszul algebra; cluster tilting; equivariant sheaves	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) J. Cimprič, S. Kuhlmann, M. Marshall: Positivity in Power Series Rings, Advances in Geometry, to appear.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Costa, AF; Izquierdo, M.; Riera, G., One-dimensional Hurwitz spaces, modular curves, and real forms of Belyi meromorphic functions, Int. J. Math. Math. Sci., 2008, 1-18, (2008)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) equivariant intersection cohomology; ring structure; hypertoric variety Braden, T.; Proudfoot, N., The hypertoric intersection cohomology ring, Invent. Math., 177, 2, 337-379, (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) pluricanonical map; variety of general type; birational map Christopher D. Hacon & James McKernan, ``Boundedness of pluricanonical maps of varieties of general type'', Invent. Math.166 (2006) no. 1, p. 1-25	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) homological mirror symmetry; derived category; Del Pezzo surfaces; Landau-Ginzburg model; Lagrangian vanishing cycles; noncommutative deformations D. Auroux, L. Katzarkov, and D. Orlov, ''Mirror Symmetry for Del Pezzo Surfaces: Vanishing Cycles and Coherent Sheaves,'' Invent. Math. 166(3), 537--582 (2006); arXiv:math/0506166.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) solvable Fuchsian equations; integer $q$-series for uniformizing functions; analytic series for holomorphic abelian integrals Brezhnev, Yu.V.: On uniformization of Burnside's curve y2=x5 - x. J. math. Phys. 50, No. 10 (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Surfaces; Classification; Meeting; Proceedings; Cortona (Italy)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) automata groups; tropical geometry; dynamical scale transform; asymptotic comparison of PDE Kato, T., Automata in groups and dynamics and tropical geometry, J. Geom. Anal., 24, 901-987, (2014)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) subadjoint ideals; hyperplane sections; sub-adjoint hypersurface	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) elliptic curves; cryptosystems; discrete logarithm; group of rational points; elliptic curve over a finite field; practical implementations; algorithms; running times R. Harasawa, J. Shikata, J. Suzuki, H. Imai, Comparing the MOV and FR reductions in elliptic curve cryptography, in: Advances in Cryptology--Eurocrypt '99, Lecture Notes in Computer Science, Vol. 1592, Springer, Berlin, 1999, pp. 190--205.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) bad matrix; admissible matrix; Jacobian conjecture; Jacobian matrix; determinant; polynomial inverse; Marcus-Yamabe conjecture Meisters, G. M.: Wanted: a bad matrix. Am. math. Monthly 102, 546-550 (1995)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) semialgebraic set-valued mappings; Sard-type theorem; subdifferential; strong regularity; metric regularity; identifiable manifold; active set; quadratic growth D. Drusvyatskiy, A. D. Ioffe, and A. S. Lewis, \textit{Generic minimizing behavior in semialgebraic optimization}, SIAM J. Optim., 26 (2016), pp. 513--534.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) Ranganathan, D., \textit{skeletons of stable maps I: rational curves in toric varieties}, J. Lond. Math. Soc. (2), 95, 804-832, (2017)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) finite representation type; maximal Cohen-Macaulay modules; ascent; descent; separable closure Wiegand R.: Local rings of finite Cohen--Macaulay type. J. Algebra 203(1), 156--168 (1998)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) generalized Jacobian; compactified Jacobian; Euler number Fantechi, B.; Göttsche, L.; van Straten, D., Euler number of the compactified Jacobian and multiplicity of rational curves, J. algebraic geom., 8, 1, 115-133, (1999)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) curves on cubic surface; Hilbert function; Rao module; Eckardt points Salvatore Giuffrida, Graded Betti numbers and Rao modules of curves lying on a smooth cubic surface in \?³, The Curves Seminar at Queen's, Vol. VIII (Kingston, ON, 1990/1991) Queen's Papers in Pure and Appl. Math., vol. 88, Queen's Univ., Kingston, ON, 1991, pp. Exp. A, 61.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) liaison; monomial curve; Hartshorne-Rao module; Buchsbaum number; linkage H. Bresinsky, F. Curtis, M. Fiorentini, and L. T. Hoa, On the structure of local cohomology modules for monomial curves in \?³_{\?}, Nagoya Math. J. 136 (1994), 81 -- 114.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) minimal complex surfaces of general type; generic vanishing theorems Hacon, CD; Pardini, R, Surfaces with $pg = q = 3$, Trans. Am. Math. Soc., 354, 2631-2638, (2002)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence $1, 2, \dots , g-2, {\lambda }, 2g-3$, J. Algebra, 276, 280-291, (2004) liaison; monomial curves; linkage of arithmetical Buchsbaum curves; Gorenstein ring Henrik Bresinsky, Peter Schenzel, and Wolfgang Vogel, On liaison, arithmetical Buchsbaum curves and monomial curves in \?³, J. Algebra 86 (1984), no. 2, 283 -- 301.	0

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semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) dimension of family of curves; exceptional Weierstrass points; reducible Hurwitz schemes Diaz, S., Moduli of curves with two exceptional Weierstrass points, J. Differ. Geom., 20, 471-478, (1984)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative algebraic geometry; coarse moduli schemes; Morita equivalence classes; Deligne-Mumford curves D. Chan and C. Ingalls, Non-commutative coordinate rings and stacks, \textit{Proc. London Math. Soc.,}\textbf{88} (2004), 63-88.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quantum algebras; coordinate rings; quantum Grassmannians; twistings; dihedral groups; torus-invariant prime ideals; totally nonnegative Grassmannians; totally positive Grassmannians	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quadratic forms; \(u\)-invariant; power series fields; function fields of curves; orderings of fields; patching of fields Scheiderer, Claus: The u-invariant of one-dimensional function fields over real power series fields, Arch. math. (Basel) 93, No. 3, 245-251 (2009)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) positive characteristic; uniform approximation of ideals; regular variety; Abhyankar valuation; test ideals; Frobenius morphism; Noetherian domain; graded system	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) vector bundles on projective spaces; moduli spaces of curves; unirationality; space curves	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) irreducible components of Hurwitz spaces; finite coverings of projective curves; semigroups over groups Kulikov, Vik.S., Kharlamov, V.M.: Covering semigroups. Izv. Math. \textbf{77}(3), 594-626 (2013)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projective embeddings of abelian varieties; Products of elliptic curves Auffarth, R., A note on Galois embeddings of abelian varieties, Manuscr. Math., 154, 279-284, (2017)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) coverings of curves; projective curve; automorphism group; linear fractional transformation; algebraic function field; finite Galois extension; Galois group	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) \(p\)-torsion points of elliptic curves; Galois representations; quadratic number field; semi-stable elliptic curves [13] A. Kraus, \(Courbes elliptiques semi-stables et corps quadratiques\), Journal of Number Theory 60, (1996), 245-253. &MR 14 \| &Zbl 0865.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) universal algebraic geometry; representations of Lie algebras; automorphic equivalence Shestakov, I; Tsurkov, A, Automorphic equivalence of the representations of Lie algebras, Algebra Discret. Math., 15, 96-126, (2013)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of stable maps from curves to projective space; arithmetic genus; geometric genus; singularities R. Pandharipande, The canonical class of \(\({\overline{M}}_{0, n}({ P}^{r}, d)\)\) and enumerative geometry. Int. Math. Res. Not. 4, 173-186 (1997)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projective space; geometry; twin building; groups of Chevally type; long root subgroup; amalgam R. Gramlich, On Graphs, Geometries, and Groups of Lie Type, Ph.D. thesis, Technische Universiteit Eindhoven, 2002.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) graded rings of modular forms; Siegel paramodular group; Satake compactification; quotient variety Ibukiyama, T., Onodera, F.: On the graded ring of modular forms of the Siegel paramodular group of level 2. Abh. Math. Semin. Univ. Hamb. 67, 297--305 (1997)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) quadratic form; Witt ring; fundamental ideal; Pfister form; Witt index; higher Witt indices; generic splitting; height of a quadratic form; stable birational equivalence; Chow motif; Tate motif; Rost motif; homogeneous variety; Rost's nilpotence theorem; Steenrod operation; motivic equivalence Kahn, B., \textit{formes quadratiques et cycles algébriques [d'après rost, Voevodsky, vishik, karpenko ...], exposé bourbaki no. 941}, Astérisque, 307, 113-163, (2006)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Mumford classes; moduli space of \(n\)-pointed stable curves; combinatorical cycles; quadratic differentials E. Arbarello and M. Cornalba, Combinatorial and algebro-geometric cohomology classes on the moduli spaces of curves, J. Algebraic Geom. 5 (1996), 705-749.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) algebraic geometry; uniformly bounded p-torsion of elliptic curves; order of group of p-torsion points Manin, Ju. I., The \textit{p}-torsion of elliptic curves is uniformly bounded, Izv. Akad. Nauk SSSR Ser. Mat., 33, 459-465, (1969)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) approximable algebras; section rings; projective varieties; big bundles; Weil divisors	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) compactification of the space parametrizing twisted cubic curves; enumerating twisted cubics	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of genus \(g\) curves \(M_{g}\); principally polarized abelian varieties of dimension \(g\); Siegel space; holomorphic sectional curvature of \(M_{g}\); Schiffer variation; Kähler form of the Siegel metric Colombo, E., Frediani, P.: Siegel metric and curvature of the moduli space of curves. Trans. Am. Math. Soc. 362(3), 1231--1246 (2010)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Hilbert scheme of lines; quadratic manifolds; second fundamental form; projective extensions Russo, F.: Lines on projective varieties and applications. Rend. Circ. Mat. Palermo 61, 47--64 (2012)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Veronese variety; Normal rational curve; Nucleus; Pascal's triangle; Multinomial coefficients; survey; nuclei of Veronese varieties; invariant subspaces of normal rational curves Havlicek H (2003) Veronese varieties over fields with non-zero characteristic: a survey. Discrete Math 267:159--173	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative curves; orbit algebra; concentrated tubes; noncommutative multiplicity; graded factorial domain D. Kussin, \textit{Memoirs of the American Mathematical Society. Vol. 201: Noncommutative curves of genus zero: related to finite dimensional algebras}, AMS Press, Providence U.S.A. (2009).	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) moduli space of curves; \(\kappa\) classes; \(\psi\) classes; Witten conjecture; enumerative geometry; intersection theory	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) nef cone; pseudoeffective cone; semistability; cone of curves; fibre product of projective bundle over a curve	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) group actions on schemes; Euler characteristics; homogeneous coordinate rings; Riemann-Roch theorems; Grothendieck groups Bleher, F.; Chinburg, T., Galois structure of homogeneous coordinate rings, Trans. Amer. Math. Soc., 360, 6269-6301, (2008)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) algebraic geometry; symmetric products of curves; semistable degeneration; homotopy groups	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) free groups; quasi-quadratic equations; algebraic geometry over groups; model theory; quasivarieties; irreducible components; definability; elementary theories; coordinate groups; finitely generated groups; universal equivalences O. Kharlampovich and A. Myasnikov, ''Algebraic geometry over free groups: Lifting solutions into generic points,'' Contemp. Math., 378, 213--318 (2005), arXiv:math.GR/0407110.	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) decomposition of Cremona transformation; projective equivalence of plane curves; complement of plane curve Yoshihara H.: On open algebraic surfaces \$\$\{\(\backslash\)mathbb\{P\}\^\{2\} - C\}\$\$ . Math. Ann. 268, 43--57 (1984)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) anabelian geometry; moduli space of curves; Grothendieck conjecture; hyperbolic polycurve; configuration space	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) varieties of modules; projective varieties; Grassmannian varieties; radical layerings of modules; finite-dimensional algebras; finite-dimensional representations; path algebras of quivers modulo relations; irreducible components of parameterizing varieties Huisgen-Zimmermann, B.: A hierarchy of parametrizing varieties for representations, in ''Rings, Modules and Representations'' (N.V. Dung, et al., eds.), Contemp. Math. \textbf{480}, 207-239 (2009)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) maximal genus of curves in projective 3-space Laurent Gruson and Christian Peskine, Postulation des courbes gauches, Algebraic geometry --- open problems (Ravello, 1982) Lecture Notes in Math., vol. 997, Springer, Berlin, 1983, pp. 218 -- 227 (French).	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) cocycle twists; noncommutative geometry; Sklyanin algebras Davies, Andrew, Cocycle twists of 4-dimensional Sklyanin algebras, J. Algebra, 457, 323-360, (2016)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) regular algebras; Noetherian Artin-Schelter regular connected graded algebras; global dimension; AS regular algebras; quantum projective space D.-M. Lu, J. H. Palmieri, Q.-S. Wu, and J. J. Zhang, ''Regular algebras of dimension 4 and their A -Extalgebras,'' Duke Math. J. 137(3), 537--584 (2007).	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Noetherian graded rings; noncommutative projective geometry; deformations; twisted homogeneous coordinate rings J.~T. Stafford and M. van~den Bergh, \emph{Noncommutative curves and noncommutative surfaces}, Bull. Amer. Math. Soc. (N.S.) \textbf{38} (2001), no.~2, 171--216. \MR{1816070}	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) noncommutative regular rings; cyclic quotient singularities; rational double points; rings of invariants; local dualities; dualizing complexes; Gorenstein singularities; Cohen-Macaulay singularities Chan, D.: Noncommutative rational double points. J. algebra 232, 725-766 (2000)	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) projectively simple rings; twisted homogeneous coordinate rings; noncommutative projective algebraic geometry; graded algebras; Artin-Schelter regular algebras; ample line bundles; Abelian varieties; Gelfand-Kirillov dimension Z. Reichstein, D. Rogalski, and J. J. Zhang, \textit{Projectively simple rings}, Adv. Math., 203:2 (2006), 365--407. MR2227726	0
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Noetherian hereditary abelian categories; Serre duality; saturation property; quivers; projective curves; graded rings; almost split sequences; Auslander-Reiten triangles; derived categories Reiten, I.; Van den Bergh, M., Noetherian hereditary abelian categories satisfying Serre duality, \textit{J. Am. Math. Soc.}, 15, 295-366, (2002)	1
semiprime graded algebras; Noetherian rings; Gelfand-Kirillov dimension; twisted homogeneous coordinate rings; Veronese rings; noncommutative projective geometry; noncommutative projective curves; algebras of quadratic growth Artin, M.; Stafford, J. T., Semiprime graded algebras of dimension two, J. Algebra, 227, 1, 68-123, (2000) Azumaya algebra; order; non-commutative projective geometry; \(m\)-point; dubbed fat point Chan, D.: Twisted rings and moduli stacks of ''fat'' point modules in non-commutative projective geometry, Adv. math. 229, No. 4, 2184-2209 (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) smooth projective varieties; flag varieties; Miyaoka's semipositivity theorem; cotangent bundle; rational surfaces; divisorial contractions; fibrations; crystalline differential operators; étale fundamental group; semistability; reflexives sheaves; semipositive sheaves; uniruled varieties; Riemann-Hilbert correspondence; stable Higgs bundle; Chern classes; flat connections; Artin's criterion of contractibility; Kodaira dimension; Hirzebruch surface; canonical divisor; surfaces of general type; Barlow's surfaces; del Pezzo surfaces; Fano three-folds	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) \(K3\) surfaces; rational points; Zariski dense F. Izadi, K. Nabardi, A note on diophantine equation \(A^4+D^4=2(B^4+C^4)\)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) genus 2; explicit equations; Selmer group; two-covering; Jacobian; Kummer surface Flynn, E. Victor; Testa, Damiano; Van Luijk, Ronald: Two-coverings of Jacobians of curves of genus 2. Proc. lond. Math. soc. (3) 104, No. 2, 387-429 (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) decidability; separating semialgebraic sets	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) surfaces in projetive 3-space; isolated singularities; rational double points Gallarati, D, Superficie algebriche con molti punti singolari isolati, Bull. Math. Soc. Sci. Math. Roumanie, 55, 249-274, (2012)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) secant variety; embedded join Simis, A., Ulrich, B.: On the ideal of an embedded join. J. Algebra 226, 1--14 (2000)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) \(F\)-blowups; \(F\)-pure surface; \(F\)-regular surface; rational double points; simple elliptic singularities \beginbarticle \bauthor\binitsN. \bsnmHara, \bauthor\binitsT. \bsnmSawada and \bauthor\binitsT. \bsnmYasuda, \batitle\(F\)-blowups of normal surface singularities, \bjtitleAlgebra Number Theory \bvolume7 (\byear2013), page 733-\blpage763. \endbarticle \OrigBibText N. Hara, T. Sawada and T. Yasuda, \(F\)-blowups of normal surface singularities, Algebra Number Theory 7 (2013), 733-763. \endOrigBibText \bptokstructpyb \endbibitem	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) higher secant variety; homogeneous ideal; symbolic power; rational normal curve Catalano-Johnson, M. L.: The homogeneous ideal of higher secant varieties. J. pure appl. Algebra 158, 123-129 (2001)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) families of singular rational curves; partial resolution of singularities	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) fibration; hyperquadrics Kachi, Y., Sato E.: Segre's Reflexivity and an Inductive Characterization of Hyperquadrics. Mem. Am. Math. Soc., 160, 763 (2002)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Łojasiewics inequality; Hilbert Nullstellensatz; Cayley-Chow form Brownawell, W. D.: Distance to common zeros and lower bounds for polynomials, , 51-60 (1992)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) rational components; Fano \(n\)-folds; connected curve; unirational varieties; rational connectedness; deformation theory; R. C. threefolds J. Kollár, Y. Miyaoka and S. Mori, Rationally connected varieties, J. Algebraic Geom. 1 (1992), no. 3, 429-448.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) AH cohomology; DGA; minimal model; \(K(\pi,1)\)-conjecture; motivic cohomology; absolute Hodge cohomology Wenger, T.: Massey products in Deligne-cohomology. PhD thesis, Münster University (2000)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) very ample line bundle; adjoint linear system; multiplier ideals L. Ein, \textit{Adjoint linear systems}, in: \textit{Current Topics in Complex Algebraic Geometry}, MSRI Publications, 1995, pp. 87-95.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) very ample line bundle; adjoint bundles; projective normality	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) extensions of formal groups; extensions of algebraic groups; Witt vectors; Frobenius endomorphism [SS] Sekiguchi, T., Suwa, N.: A note on extensions of algebraic and formal groups I. Math. Z.206, 567--575 (1991)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) complex superspace; superstack; Moduli superstack; supersymmetric curves; Kuranishi family	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Symmetries of surfaces Gromadzki G.: On Singerman symmetries of a class of Belyi Riemann surfaces. J. Pure Appl. Algebra 213, 1905--1910 (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) smoothness; lexicographic point; Hilbert scheme; JFM 53.0104.01; Hilbert polynomial A. Reeves - M. Stillman, Smoothness of the lexicographic point. J. Algebraic Geom., 6 (2) (1997), pp. 235-246. Zbl0924.14004 MR1489114	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) moduli spaces; equivariant Euler characteristic; orbifold Euler characteristic DOI: 10.1016/j.aim.2013.10.003	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) conics; curve theory	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) algebraic surfaces; algebraic curves	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) rationality of moduli space of curves of genus 2; rationality of moduli space of nodal cubics	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) group invariants; retract rational; Galois extensions; approximation property; finite rank; transcendental extension; Noether's problem; survey David J. Saltman,Groups Acting on Fields: Noether's Problem, Contemp. Mathematics43 (1985), 267--277	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) parabola; fourth order curves; nodes; doublepoints	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) integral intersection homology; weighted projective spaces; pseudo-lens spaces; torsion	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) algebraic stack; Hodge class Yamaki K.: Cornalba-Harris equality for semistable hyperelliptic curves in positive characteristic. Asian J. Math. 8(3), 409--426 (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) characterization of finite group of polynomial automorphisms; algebraic compactification Furushima, M.: Finite groups of polynomial automorphisms in ? n . Tohoku Math. J.35, 415-424 (1983)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) complements of an arrangement of hyperplanes; Coxeter arrangements	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) generic projections; generic singularities; local defining ideal	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) black holes in string theory; D-branes Govindarajan S 2011 BKM Lie superalgebras from counting twisted CHL dyons \textit{J. High Energy Phys.}JHEP05(2011) 089	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) localized schemes; determinants; fraction rings	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Samuel Boissière and Marc A. Nieper-Wißkirchen, Universal formulas for characteristic classes on the Hilbert schemes of points on surfaces, J. Algebra 315 (2007), no. 2, 924 -- 953.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Hurwitz-Hodge integrals; orbifold Hurwitz numbers; cut-and-join equation; Laplace transformation	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) J.-X. Cai, Degree of the canonical map of a Georenstein \(3\)-fold of general type, Proc. Amer. Math. Soc. 136 (2008), no. 5, 1565--1574.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Giambelli's formulas; quantum equivariant Schubert calculus; factorial Schur functions L.C. Mihalcea, \textit{Giambelli formulae for the equivariant quantum cohomology of the Grassmannian}, \textit{Trans. AMS}\textbf{360} (2008) 2285 [math/0506335].	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) real reductive group; admissible representation; multiplicity; hyperfunction; unitary representation; spherical variety; symmetric space Kashiwara, M.: On the maximally overdetermined system of linear differential equations. I. Publ. Res. Inst. Math. Sci. \textbf{10}, 563-579 (1974/75)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Singularities; Geometry; Topology; Sapporo (Japan); Proceedings	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) trivial extension; braid group action; spherical twist; quiver; derived category; Koszul algebra; cluster tilting; equivariant sheaves	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) J. Cimprič, S. Kuhlmann, M. Marshall: Positivity in Power Series Rings, Advances in Geometry, to appear.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Costa, AF; Izquierdo, M.; Riera, G., One-dimensional Hurwitz spaces, modular curves, and real forms of Belyi meromorphic functions, Int. J. Math. Math. Sci., 2008, 1-18, (2008)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) equivariant intersection cohomology; ring structure; hypertoric variety Braden, T.; Proudfoot, N., The hypertoric intersection cohomology ring, Invent. Math., 177, 2, 337-379, (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) pluricanonical map; variety of general type; birational map Christopher D. Hacon & James McKernan, ``Boundedness of pluricanonical maps of varieties of general type'', Invent. Math.166 (2006) no. 1, p. 1-25	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) homological mirror symmetry; derived category; Del Pezzo surfaces; Landau-Ginzburg model; Lagrangian vanishing cycles; noncommutative deformations D. Auroux, L. Katzarkov, and D. Orlov, ''Mirror Symmetry for Del Pezzo Surfaces: Vanishing Cycles and Coherent Sheaves,'' Invent. Math. 166(3), 537--582 (2006); arXiv:math/0506166.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) solvable Fuchsian equations; integer \(q\)-series for uniformizing functions; analytic series for holomorphic abelian integrals Brezhnev, Yu.V.: On uniformization of Burnside's curve y2=x5 - x. J. math. Phys. 50, No. 10 (2009)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Surfaces; Classification; Meeting; Proceedings; Cortona (Italy)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) automata groups; tropical geometry; dynamical scale transform; asymptotic comparison of PDE Kato, T., Automata in groups and dynamics and tropical geometry, J. Geom. Anal., 24, 901-987, (2014)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) subadjoint ideals; hyperplane sections; sub-adjoint hypersurface	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) elliptic curves; cryptosystems; discrete logarithm; group of rational points; elliptic curve over a finite field; practical implementations; algorithms; running times R. Harasawa, J. Shikata, J. Suzuki, H. Imai, Comparing the MOV and FR reductions in elliptic curve cryptography, in: Advances in Cryptology--Eurocrypt '99, Lecture Notes in Computer Science, Vol. 1592, Springer, Berlin, 1999, pp. 190--205.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) bad matrix; admissible matrix; Jacobian conjecture; Jacobian matrix; determinant; polynomial inverse; Marcus-Yamabe conjecture Meisters, G. M.: Wanted: a bad matrix. Am. math. Monthly 102, 546-550 (1995)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) semialgebraic set-valued mappings; Sard-type theorem; subdifferential; strong regularity; metric regularity; identifiable manifold; active set; quadratic growth D. Drusvyatskiy, A. D. Ioffe, and A. S. Lewis, \textit{Generic minimizing behavior in semialgebraic optimization}, SIAM J. Optim., 26 (2016), pp. 513--534.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Ranganathan, D., \textit{skeletons of stable maps I: rational curves in toric varieties}, J. Lond. Math. Soc. (2), 95, 804-832, (2017)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) finite representation type; maximal Cohen-Macaulay modules; ascent; descent; separable closure Wiegand R.: Local rings of finite Cohen--Macaulay type. J. Algebra 203(1), 156--168 (1998)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) generalized Jacobian; compactified Jacobian; Euler number Fantechi, B.; Göttsche, L.; van Straten, D., Euler number of the compactified Jacobian and multiplicity of rational curves, J. algebraic geom., 8, 1, 115-133, (1999)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) curves on cubic surface; Hilbert function; Rao module; Eckardt points Salvatore Giuffrida, Graded Betti numbers and Rao modules of curves lying on a smooth cubic surface in \?³, The Curves Seminar at Queen's, Vol. VIII (Kingston, ON, 1990/1991) Queen's Papers in Pure and Appl. Math., vol. 88, Queen's Univ., Kingston, ON, 1991, pp. Exp. A, 61.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) liaison; monomial curve; Hartshorne-Rao module; Buchsbaum number; linkage H. Bresinsky, F. Curtis, M. Fiorentini, and L. T. Hoa, On the structure of local cohomology modules for monomial curves in \?³_{\?}, Nagoya Math. J. 136 (1994), 81 -- 114.	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) minimal complex surfaces of general type; generic vanishing theorems Hacon, CD; Pardini, R, Surfaces with \(pg = q = 3\), Trans. Am. Math. Soc., 354, 2631-2638, (2002)	0
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) liaison; monomial curves; linkage of arithmetical Buchsbaum curves; Gorenstein ring Henrik Bresinsky, Peter Schenzel, and Wolfgang Vogel, On liaison, arithmetical Buchsbaum curves and monomial curves in \?³, J. Algebra 86 (1984), no. 2, 283 -- 301.	0