Datasets:
AnkitSatpute
/
zbMath_mscref

Dataset card Data Studio Files
xet
Community
1
text
stringlengths
68
2.01k
label
int64
0
1
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Ramella, I.: Ideals of points in generic position: a polynomial algorithm for computing a minimal set of generators. Ricerche di matematica 43, 205-217 (1994) Symbolic computation and algebraic computation, Gröbner bases; other bases for ideals and modules (e.g., Janet and border bases), Analysis of algorithms and problem complexity, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Ciliberto, C., European Congress of Mathematics, 201, Geometric aspects of polynomial interpolation in more variables and of Waring's problem, 289-316, (2001), Birkhäuser: Birkhäuser, Basel Projective techniques in algebraic geometry, Divisors, linear systems, invertible sheaves, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Syzygies, resolutions, complexes and commutative rings, Curves in algebraic geometry, Projective techniques in algebraic geometry
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties DOI: 10.1080/00927879508825349 Complete intersections, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Projective and enumerative algebraic geometry, Linkage, complete intersections and determinantal ideals
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Vector bundles on surfaces and higher-dimensional varieties, and their moduli, Divisors, linear systems, invertible sheaves, Determinantal varieties
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Determinantal varieties, Combinatorial aspects of matroids and geometric lattices, Grassmannians, Schubert varieties, flag manifolds, Arrangements of points, flats, hyperplanes (aspects of discrete geometry), Cohen-Macaulay modules
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Gaffney, Terence; Vitulli, Marie A., Weak subintegral closure of ideals, Adv. Math., 226, 3, 2089-2117, (2011) Integral closure of commutative rings and ideals, Seminormal rings, Normal analytic spaces, Associated graded rings of ideals (Rees ring, form ring), analytic spread and related topics, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Singularities of curves, local rings, Singularities in algebraic geometry, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Conca, A.; De Negri, E.; Rossi, M. E.: On the rate of points in projective spaces. Israel J. Math. 124, 253-265 (2001) Syzygies, resolutions, complexes and commutative rings, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Cohen-Macaulay modules, Projective techniques in algebraic geometry
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties V. Kanev, Chordal varieties of Veronese varieties and catalecticant matrices,J. Math. Sci. 94, (1999), 1114--1125. Determinantal varieties
1
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Ruderman, DL, Origins of scaling in natural images, Vision Res., 37, 3385-3398, (1997) Computational aspects of algebraic surfaces, Syzygies, resolutions, complexes and commutative rings, Computational aspects of algebraic curves, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties DOI: 10.1090/S0002-9947-04-03594-9 Projective techniques in algebraic geometry, Rational and ruled surfaces, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Low codimension problems in algebraic geometry
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Laksov, D.; Speiser, R.: Local and global structure of effective and cuspidal loci on grassmannians, Comm. alg. 31, No. 8, 3993-4006 (2003) Grassmannians, Schubert varieties, flag manifolds, Determinantal varieties, Enumerative problems (combinatorial problems) in algebraic geometry, Differentials and other special sheaves; D-modules; Bernstein-Sato ideals and polynomials
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Polynomial rings and ideals; rings of integer-valued polynomials, Ideals and multiplicative ideal theory in commutative rings, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Rational and unirational varieties
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties H. Abo, A. Seigal, and B. Sturmfels, \textit{Eigenconfigurations of tensors}, in Algebraic and Geometric Methods in Discrete Mathematics, Contemp. Math. 685, American Mathematical Society, Providence, RI, 2017, pp. 1--25. Eigenvalues, singular values, and eigenvectors, Applications of commutative algebra (e.g., to statistics, control theory, optimization, etc.), Determinantal varieties, Multilinear algebra, tensor calculus
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties [CRV2] Cavaliere, M.P., Rossi, M.E., Valla, G.: On the resolution of certain graded algebras. Trans. Am. Math. Soc.337, (1), 389--409 (1993) Homological methods in commutative ring theory, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Graded rings
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Miller, E., Sturmfels, B., Yanagawa, K.: Generic and cogeneric monomial ideals, Symbolic computation in algebra, analysis, and geometry (Berkeley, CA, 1998). J. Symbolic Comput. \textbf{29}(4-5), 691-708 (2000) Syzygies, resolutions, complexes and commutative rings, Projective techniques in algebraic geometry, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties I. Biswas, S. Nag, D. Sullivan. ''Determinant bundles, Quillen metrics and Mumford isomorphisms over the universal commensurability Teichm\"{}uller space''. Acta Math. 176 (1996), no. 2, 145--169. Moduli of Riemann surfaces, Teichmüller theory (complex-analytic aspects in several variables), Determinants and determinant bundles, analytic torsion, Determinantal varieties, Families, moduli of curves (analytic)
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties M. Catalisano, A. Geramita, and A. Gimigliano, \textit{Ranks of tensors, secant varieties of Segre varieties and fat points}, Linear Algebra Appl., 355 (2002), pp. 263--285, . Projective techniques in algebraic geometry, Multilinear algebra, tensor calculus, Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series
1
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties V. Kanev, Chordal varieties of Veronese varieties and catalecticant matrices,J. Math. Sci. 94, (1999), 1114--1125. Determinantal varieties
1
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Sam, S. V., Ideals of bounded rank symmetric tensors are generated in bounded degree, Invent. Math., 1-21, (2016), appeared online Projective techniques in algebraic geometry, Multilinear algebra, tensor calculus, Commutative Noetherian rings and modules, Special varieties, Coalgebras and comodules; corings
1
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties J. V. Chipalkatti, Decomposable ternary cubics. Experiment. Math. 11 (2002), 69-80. Zbl1046.14500 MR1960301 Classical groups (algebro-geometric aspects), Forms of degree higher than two, Computational aspects in algebraic geometry, Geometric invariant theory
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties Chipalkatti, J.: The Waring loci of ternary quartics. Exp. math. 13, No. 1, 93-101 (2004) Projective techniques in algebraic geometry, Classical groups (algebro-geometric aspects), Actions of groups on commutative rings; invariant theory, Polynomial rings and ideals; rings of integer-valued polynomials, Forms of degree higher than two
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties DOI: 10.1081/AGB-120028789 Projective techniques in algebraic geometry, Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Forms of degree higher than two, Vector and tensor algebra, theory of invariants
0
O. Porras, ''Rank varieties and their desingularizations,''J. Algebra,186, 677--723 (1996). Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal), Determinantal varieties DOI: 10.1307/mmj/1049832900 Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series, Syzygies, resolutions, complexes and commutative rings, Classical problems, Schubert calculus
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Notari, R.: On the computation of Weierstrass gap sequences, Rend. sem. Mat. univ. Pol Torino 57, No. 1 (1999) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves, Computational aspects in algebraic geometry
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Bernard Deconinck and Matthew S. Patterson, Computing with plane algebraic curves and Riemann surfaces: the algorithms of the Maple package ''algcurves'', Computational approach to Riemann surfaces, Lecture Notes in Math., vol. 2013, Springer, Heidelberg, 2011, pp. 67 -- 123. Computational aspects of algebraic curves, Riemann surfaces; Weierstrass points; gap sequences, Plane and space 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Girard, M., The group of Weierstrass points of a plane quartic with at least eight hyperflexes, Math. Comp., 75, 1561-1583, (2006) Riemann surfaces; Weierstrass points; gap sequences, Curves of arbitrary genus or genus \(\ne 1\) over global fields, Computational aspects of algebraic curves, Jacobians, Prym varieties
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves 11. Matsumoto, R., Miura, S.: Finding a basis of a linear system with pairwise distinct discrete valuations on an algebraic curve. J. Symb. Comput. 30 (3), 309-323 (2000). Computational aspects of algebraic curves, Geometric methods (including applications of algebraic geometry) applied to coding theory, Valuations and their generalizations for commutative rings, Divisors, linear systems, invertible sheaves, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Geometric methods (including applications of algebraic geometry) applied to coding theory, Riemann surfaces; Weierstrass points; gap sequences, Divisors, linear systems, invertible 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves García, Arnaldo; Lax, R.F., Goppa codes and Weierstrass gaps, (), 33-42, MR 1186414 Geometric methods (including applications of algebraic geometry) applied to coding theory, Computational aspects of algebraic curves, Linear codes (general theory), Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Curves of arbitrary genus or genus \(\ne 1\) over global fields, Jacobians, Prym varieties, Families, moduli of curves (algebraic), Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Bobenko, A.I., Klein, C. (eds.): Computational approach to riemann surfaces, Lect. Notes Math. \textbf{2013} (2011) Research exposition (monographs, survey articles) pertaining to algebraic geometry, Software, source code, etc. for problems pertaining to algebraic geometry, Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves, Compact Riemann surfaces and uniformization, Software, source code, etc. for problems pertaining to functions of a complex variable
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Frauendiener J, Klein C and Shramchenko V 2011 Efficient computation of the branching structure of an algebraic curve \textit{Comput. Methods Funct. Theory}11 527--46 Computational aspects of algebraic curves, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Elliptic curves, Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves, Symbolic computation and algebraic computation
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Contiero, A.; Moreira, C. G. T. A.; Veloso, P. M., On the structure of numerical sparse semigroups and applications to Weierstrass points, J. Pure Appl. Algebra, 219, 3946-3957, (2015) Commutative semigroups, Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Campillo, A., Farrán, J.I.: Symbolic Hamburger-Noether expressions of plane curves and applications to AG codes. Math. Comput. 71, 1759-1780 (2001) Computational aspects of algebraic curves, Applications to coding theory and cryptography of arithmetic geometry, Algebraic coding theory; cryptography (number-theoretic aspects), Riemann surfaces; Weierstrass points; gap sequences, Geometric methods (including applications of algebraic geometry) applied to coding 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Symbolic computation and algebraic computation, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Arnaldo Garcia and Henning Stichtenoth, Elementary abelian \(p\)-extensions of algebraic function fields, Manuscr. Math. 72 (1991), 67--79. Algebraic functions and function fields in algebraic geometry, Arithmetic theory of algebraic function fields, Geometric methods (including applications of algebraic geometry) applied to coding theory, Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Special algebraic curves and curves of low genus, Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves M. Harrison, Explicit solution by radicals, gonal maps and plane models of algebraic curves of genus \(5\) or \(6\), J. Symb. Comp., 51, 3, (2013) Plane and space curves, Special divisors on curves (gonality, Brill-Noether theory), Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Contiero, A.; Stöhr, K.-O., Upper bounds for the dimension of moduli spaces of curves with symmetric Weierstrass semigroups, J. Lond. Math. Soc., 2, 580-598, (2013) Families, moduli of curves (algebraic), Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves
1
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Campillo, A., Farrán, J.I.: Computing Weierstrass semigroups and the Feng-Rao distance from singular plane models. Finite Fields Their Appl. 6(1), 71-92 (2000) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves, Bounds on codes, Linear codes (general theory), Geometric methods (including applications of algebraic geometry) applied to coding 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves D. Gordon and D. Grant, Computing the Mordell-Weil rank of Jacobians of curves of genus two , Trans. Amer. Math. Soc. 337 (1993), no. 2, 807-824. JSTOR: Jacobians, Prym varieties, Special algebraic curves and curves of low genus, Computational aspects of algebraic curves, Riemann surfaces; Weierstrass points; gap sequences, Arithmetic ground fields for abelian varieties, Computer solution of Diophantine equations
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Gromadzki G.: On Singerman symmetries of a class of Belyi Riemann surfaces. J. Pure Appl. Algebra 213, 1905--1910 (2009) Compact Riemann surfaces and uniformization, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves G. Gromadzki. Symmetries of Riemann surfaces from a combinatorial point of view. London Mathematical Society Lecture Note Series, Cambridge University Press 287 (2001), 91--112. Automorphisms of curves, Riemann surfaces; Weierstrass points; gap sequences, Fuchsian groups and their generalizations (group-theoretic aspects), Compact Riemann surfaces and uniformization
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Norms of matrices, numerical range, applications of functional analysis to matrix theory, Theta functions and curves; Schottky problem
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Rabin, J. M.; Topiwala, P.: Super Riemann surfaces are algebraic curves. (1988) Supervarieties, Riemann surfaces; Weierstrass points; gap sequences, Algebraic dependence theorems, Riemann surfaces, Moduli of Riemann surfaces, Teichmüller theory (complex-analytic aspects in several variables)
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Coverings of curves, fundamental group, Arithmetic ground fields for curves, Local ground fields in algebraic geometry, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Families, moduli of curves (algebraic), Arithmetic ground fields for curves, Automorphisms of curves, Special algebraic curves and curves of low genus, Plane and space 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Min T.: Online database for optimal parameters of \( (t,m,s) \)-nets, \( (t,s) \)-sequences, orthogonal arrays, and linear codes. http://mint.sbg.ac.at (2017). Accessed 10 Jan 2017. Geometric methods (including applications of algebraic geometry) applied to coding theory, Riemann surfaces; Weierstrass points; gap sequences, Applications to coding theory and cryptography of arithmetic geometry, Bounds on codes
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series, Computational aspects of algebraic curves, Projective techniques in algebraic geometry, Computational aspects and applications of commutative 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Brundu, M; Sacchiero, G, On the varieties parametrizing trigonal curves with assigned Weierstrass points, Commun. Algebra, 26, 3291-3312, (1998) Special divisors on curves (gonality, Brill-Noether theory), Riemann surfaces; Weierstrass points; gap sequences, Families, moduli of curves (algebraic), Divisors, linear systems, invertible 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Coverings of curves, fundamental group, Riemann surfaces; Weierstrass points; gap sequences, Relations of low-dimensional topology with graph theory, Enumeration in graph theory, Functional calculus for linear operators, Topological methods in group 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Families, moduli of curves (algebraic), Plane and space curves, Arithmetic ground fields for curves, Curves over finite and local fields, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Arithmetic ground fields for curves, Finite ground fields in algebraic geometry, Divisors, linear systems, invertible sheaves, Picard groups, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Special divisors on curves (gonality, Brill-Noether theory), Riemann surfaces; Weierstrass points; gap sequences, Vector bundles on curves and their moduli
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Model quantum field theories, Compact Riemann surfaces and uniformization, Spaces of embeddings and immersions, Applications of Lie (super)algebras to physics, etc., Spinor and twistor methods applied to problems in quantum theory, Clifford algebras, spinors, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Coppens, Limit Weierstrass schemes on stable curves with 2 irreducible components, Atti Accad. Naz. Lincei 9 pp 205-- (2001) Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Matsutani, S.; Previato, E., Jacobi inversion on strata of the Jacobian of the \(C_{rs}\) curve \(y^r=f(x)\) II, J. Math. Soc. Jpn., 66, 647-692, (2014) Analytic theory of abelian varieties; abelian integrals and differentials, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves W. Decker, G.-M. Greuel, T. de Jong, G. Pfister, The normalization: a new algorithm, implementation and comparisons, in: Computational Methods for Representation of Groups and Algebra (Essen, 1997), Birkhaüser, Basel, 1999, pp. 177--185. Integral closure of commutative rings and ideals, Software, source code, etc. for problems pertaining to commutative algebra, Computational aspects of algebraic curves, Software, source code, etc. for problems pertaining to algebraic geometry, Polynomial rings and ideals; rings of integer-valued polynomials
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Gao S., Shokrollahi M.: Computing roots of polynomials over function fields of curves. In: Coding Theory and Cryptography: From Enigma and Geheimschreiber to Quantum Theory. Springer, Berlin, pp. 214--228 (2000). Computational aspects of algebraic curves, Algebraic coding theory; cryptography (number-theoretic aspects), Applications to coding theory and cryptography of arithmetic geometry, Geometric methods (including applications of algebraic geometry) applied to coding 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Affine analytic geometry, Plane and space curves, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Riemann surfaces; Weierstrass points; gap sequences, Compact Riemann surfaces and uniformization
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves DOI: 10.1088/0305-4470/39/45/027 Supersymmetry and quantum mechanics, Operator algebra methods applied to problems in quantum theory, Information theory (general), Closed and approximate solutions to the Schrödinger, Dirac, Klein-Gordon and other equations of quantum mechanics, Applications of Lie groups to the sciences; explicit representations, Quantum optics, Riemann surfaces; Weierstrass points; gap sequences, Coherent states, Projective techniques in algebraic geometry
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Ramadas, T. R.: Faltings construction of the K -- Z connection. Comm. math. Phys. 196, 133-143 (1998) Riemann surfaces; Weierstrass points; gap sequences, Special connections and metrics on vector bundles (Hermite-Einstein, Yang-Mills), Families, moduli of curves (algebraic), Vector bundles on curves and their moduli
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Guida M., Orecchia F.: Algebraic properties of grids of projective lines. J. Pure Appl. Algebra 208, 603--615 (2007) Computational aspects of algebraic curves, Projective techniques in algebraic geometry
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Nagao, K-i; Hanrot, G. (ed.); Morain, F. (ed.); Thomé, E. (ed.), Decomposition attack for the Jacobian of a hyperelliptic curve over an extension field, 285-300, (2010), Heidelberg Curves over finite and local fields, Number-theoretic algorithms; complexity, Computational aspects of algebraic curves, Cryptography
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Amram, M; Teicher, M, Fundamental groups of some special quadric arrangements, Rev. Mat. Comput., 19, 259-276, (2006) Singularities of curves, local rings, Coverings of curves, fundamental group, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Cryptography, Number-theoretic algorithms; complexity, Applications to coding theory and cryptography of arithmetic geometry, Computational aspects of algebraic curves, Linear algebraic groups over finite fields
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Real algebraic sets, Computational aspects of algebraic curves, Computational aspects of algebraic surfaces
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Software, source code, etc. for problems pertaining to algebraic geometry, Plane and space 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Breda~d'Azevedo, A., Catalano, D.A., Karabáš, J., Nedela, R.: Census of quadrangle groups inclusions. In: Širáň, J., Jajcay, R. (eds.) Symmetries in Graphs, Maps, and Polytopes: 5th SIGMAP Workshop, West Malvern, UK, July 2014, pp. 27-69. Springer, Cham (2016a) Fuchsian groups and their generalizations (group-theoretic aspects), Riemann surfaces; Weierstrass points; gap sequences, Fuchsian groups and automorphic functions (aspects of compact Riemann surfaces and uniformization), Generators, relations, and presentations of groups
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Plane and space curves, Determinantal varieties
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Watanabe, K, An example of the Weierstrass semigroup of a pointed curve on K3 surfaces, Semigroup Forum, 86, 395-403, (2013) Riemann surfaces; Weierstrass points; gap sequences, Coverings of curves, fundamental group, \(K3\) surfaces and Enriques surfaces
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Finite ground fields in algebraic geometry, Curves over finite and local fields, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves 14. Saleem, M. & Badr, E. [2014] '' Classification of Weierstrass points on Kuribayashi quartics, I (with two parameters),'' Electron J. Math. Anal. Appl.2, 214-227. Riemann surfaces; Weierstrass points; gap sequences, Special algebraic curves and curves of low genus
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Isogeny, Applications to coding theory and cryptography of arithmetic geometry, Computational aspects of algebraic curves, Finite fields and commutative rings (number-theoretic aspects), Random walks on graphs
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Ballico, E.: Trigonal Gorenstein curves and Weierstrass points. Tsukuba J. Math. 26, 133-144 (2002) Riemann surfaces; Weierstrass points; gap sequences, Special divisors on curves (gonality, Brill-Noether theory), Varieties defined by ring conditions (factorial, Cohen-Macaulay, seminormal)
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Shioda, T.: The Galois Representations of TypeE 8 Arising from Certain Mordell-Weil Groups, Proc. Japan Acad.65A, 195--197 (1989) Rational points, Elliptic curves, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Joye, M.: Fast point multiplication on elliptic curves without precomputation. In: Gathen, J., Imaña, J.L., Koç, Ç.K. (eds.) WAIFI 2008. LNCS, vol. 5130, pp. 36--46. Springer, Heidelberg (2008) Cryptography, Finite ground fields in algebraic geometry, Computational aspects of algebraic curves, Elliptic 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Zeta functions and related questions in algebraic geometry (e.g., Birch-Swinnerton-Dyer conjecture), Finite ground fields in algebraic geometry, Singularities of curves, local rings, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Computer-aided design (modeling of curves and surfaces), Computational aspects of algebraic surfaces, Numerical aspects of computer graphics, image analysis, and computational geometry, Computer graphics; computational geometry (digital and algorithmic aspects)
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Malcolm R. Adams, Clint McCrory, Theodore Shifrin, and Robert Varley, Symmetric Lagrangian singularities and Gauss maps of theta divisors, Singularity theory and its applications, Part I (Coventry, 1988/1989) Lecture Notes in Math., vol. 1462, Springer, Berlin, 1991, pp. 1 -- 26. Theta functions and abelian varieties, Riemann surfaces; Weierstrass points; gap sequences, Jacobians, Prym varieties, Theta functions and curves; Schottky problem
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Elliptic curves, Number-theoretic algorithms; complexity, Isogeny
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Singerman, D; Bujalance, E (ed.); Costa, AF (ed.); Martínez, E (ed.), Riemann surfaces, Belyi functions and hypermaps, 43-68, (2001), Cambridge Riemann surfaces; Weierstrass points; gap sequences, Compact Riemann surfaces and uniformization, Universal profinite groups (relationship to moduli spaces, projective and moduli towers, Galois 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Special algebraic curves and curves of low genus, Jacobians, Prym varieties, Computational aspects of algebraic curves, Abelian varieties of dimension \(> 1\), Curves over finite and local fields, Algebraic coding theory; cryptography (number-theoretic aspects)
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Frauendiener J and Klein C 2011 Algebraic curves and Riemann surfaces in Matlab \textit{Riemann Surfaces--Computational Approaches}\textit{(Lecture Notes in Mathematics vol 2013)} ed A Bobenko and C Klein (Berlin: Springer) Computational aspects of algebraic curves, Plane and space 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves C. Diem and E. Thomé, Index calculus in class groups of non-hyperelliptic curves of genus 3, 2006, preprint. Number-theoretic algorithms; complexity, Algebraic coding theory; cryptography (number-theoretic aspects), Applications to coding theory and cryptography of arithmetic geometry, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Riemann surfaces; Weierstrass points; gap sequences, Coverings of curves, fundamental group, Families, moduli of curves (algebraic), Special algebraic curves and curves of low genus, Algebraic cycles
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Magaard, K.; Völklein, H.: On Weierstrass points of Hurwitz curves, J. algebra 300, No. 2, 647-654 (2006) Riemann surfaces; Weierstrass points; gap sequences, Automorphisms of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves M. Saïdi, Revêtements étales et réduction semi-stable des courbes, C. R. Acad. Sci. Paris, t.316 (1993), 1299--1302 Coverings of curves, fundamental group, Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Albano, A.; Roggero, M., Conchoidal transform of two plane curves, Appl. Algebra Eng. Commun. Comput., 21, 309-328, (2010) Special algebraic curves and curves of low genus, Plane and space curves, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Konno, K.: Projected canonical curves and the Clifford index. Publ. res. Inst. math. Sci. 41, No. 2, 397-416 (2005) Special divisors on curves (gonality, Brill-Noether theory), Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Lawson Jr., H.B.: Lectures on minimal submanifolds, vol. I, 2 edn. In: Mathematics Lecture Series 9. Publish or Perish, Wilmington (1980) Riemann surfaces; Weierstrass points; gap sequences
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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Computational aspects of algebraic curves, Plane and space 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Polynomials, factorization in commutative rings, Symbolic computation and algebraic computation, Plane and space curves, Computational aspects of 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) Riemann surfaces; Weierstrass points; gap sequences, Computational aspects of algebraic curves Brieskorn, E., & Knörrer, H. (1986). \textit{Plane algebraic curves}. Basel: Birkhäuser Verlag. (Originally published in German, 1981; translated by J. Stillwell.) Computational aspects of algebraic curves
0