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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) algorithms; computation in the Jacobian of a hyperelliptic curve D. G. Cantor, \textit{Computing in the Jacobian of a hyperelliptic curve}, Math. Comp., 48 (1987), pp. 95--101, . | 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) involutive monoidal category; enriched category; Fell bundle; spaceoid; noncommutative 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) deformations of tetragonal canonical curves; projective extensions; complete intersections on scrolls; rolling deformations; \(K3\) surfaces Stevens J., Rolling factors deformations and extensions of canonical curves, Doc. Math. 6 (2001), 185-226, electronic. | 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 Chow groups; motivic homology R. Joshua, Intersection theory on algebraic stacks. I, II, K-theory 27 (2002), no. 2, 134-195 and no. 3, 197-244. | 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) split octonion algebra; automorphism group; Lie group of type \(G_2\); symmetric rooms; Bruhat-Tits buildings; standard apartment; Arakelov bundles; invariant flag | 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) modular cusp forms; \(p\)-adic wavelets; theta functions; \( L \)-functions | 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; algebraic moduli; theta functions; Schottky problem; special 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) Galois representations; varieties over local ground fields; étale cohomology; motivic Galois representations; elliptic curves J. Coates, R. Sujatha and J.-P. Wintenberger, On the Euler-Poincaré characteristics of finite dimensional \(p\)-adic Galois representations, Publ. Math. Inst. Hautes Études Sci. 93 (2001), 107-143. | 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) uniform Artin-Rees property; relation type O\(###\)Carroll, L.; Planas-Vilanova, F., Irreducible affine space curves and the uniform Artin-Rees property on the prime spectrum, J. Algebra, 320, 3339-3344, (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) derivations; monomial ideals; multiplier ideals Tadesse, Y., Derivations preserving a monomial ideal, Proc. Amer. Math. Soc., 137, 2935-2942, (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) polynomial mapping; affine space; proper mapping Aliashvili, T, Geometry and topology of proper polynomial mappings, J. Math. Sci., 160, 679-692, (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) elliptic curve; abelian variety; Birch--Swinnerton-Dyer conjecture; parity conjecture; root number T. Dokchitser and V. Dokchitser, ''On the Birch-Swinnerton-Dyer quotients modulo squares,'' Ann. of Math., vol. 172, iss. 1, pp. 567-596, 2010. | 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) Grassmannian; Chern classes; codimension one; codimension two | 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) proper holomorphic maps of strictly pseudoconvex domains into polydiscs and balls; continuous extension to the boundary; Hakim-Sibony-Løw construction of inner functions; proper holomorphic embedding Løw, E., Embeddings and proper holomorphic maps of strictly pseudoconvex domains into polydiscs and balls, Math. Z., 190, 401-410, (1985) | 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) Abelian surfaces; Complex multiplication; Genus 2 curves Goren, E.; Lauter, K., \textit{genus 2 curves with complex multiplication}, Int. Math. Res. Not. IMRN, 2012, 1068-1142, (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) mixed Hodge structure; Feynman integral; Symanzik polynomial Vanhove, P., The physics and the mixed Hodge structure of Feynman integrals, Proc. Symp. Pure Math., 88, 161-194, (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) equivariant homology; weight filtration; real algebraic varieties; group action; additive invariants F. Priziac, Equivariant weight filtration for real algebraic varieties with action, J. Math. Soc. Japan (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) elliptic curves; computational number theory; invariant theory DOI: 10.1016/j.jalgebra.2008.04.007 | 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) Hitchin systems; gluing subschemes; integrable systems; singular algebraic curves; \(r\)-matrix | 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) dual graphs; Hilbert schemes; Kontsevich moduli spaces of stable maps; stacks Harris, J; Roth, M; Starr, J, Rational curves on hypersurfaces of low degree, J. Reine Angew. Math., 571, 73-106, (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) intersection cohomology; small resolution for any Schubert cell Zelevinskiĭ, A. V.: Small resolutions of singularities of Schubert varieties. Funct. anal. Appl. 17, No. 2, 142-144 (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) Calabi program; deformation theory; global analysis; toric variety; extremal metrics [24] Yann Rollin &aCarl Tipler, &Deformations of extremal toric manifolds'', preprint 2013, math.DG/1201MR~32 | 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) theta divisor; principally polarized abelian varieties; Andreotti-Mayer loci; intermediate Jacobians; cubic threefolds; Chow ring; cohomology ring S. Grushevsky and K. Hulek, Geometry of theta divisors--A survey, A celebration of algebraic geometry, Clay Math. Proc. 18, American Mathematical Society, Providence (2013), 361-390. | 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) transformation group; semialgebraic set; orbit space | 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) Semaev polynomials; elliptic curves; point decomposition problem; discrete logarithm problem Karabina, K., Point decomposition problem in binary elliptic curves, (International Conference on Information Security and Cryptology, (2015), Springer International Publishing) | 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) orthogonal and symplectic bundles; parabolic structure; Einstein-Hermitian connection Biswas, I.; Majumder, S.; Wong, M. L.: Orthogonal and symplectic parabolic bundles, J. geom. Phys. 61, 1462-1475 (2011) | 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 model; reduction map; abundance Yoshinori Gongyo & Brian Lehmann, ``Reduction maps and minimal model theory'', Compos. Math.149 (2013) no. 2, p. 295-308 | 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) Mumford-Tate conjecture; abelian varieties; Shimura varieties Vasiu, A., \textit{some cases of the Mumford-Tate conjecture and Shimura varieties}, Indiana Univ. Math. J., 57, 1-75, (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) Pfaffian quadratic singularity; theta-divisor of the Prym variety; singularities with tangent cone; Mumford singularities V. Kanev,Quadratic singularities of the Pfaffian theta divisor of a Prym variety, Math. Notes of the Ac. of Sc. of the USSR,31 (1982), 301--305. | 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) finite groups; finite simple groups; applications of simple groups; Brauer groups; Riemann surfaces; polynomials; function fields Guralnick, Robert, Applications of the classification of finite simple groups.Proceedings of the International Congress of Mathematicians---Seoul 2014. Vol. II, 163-177, (2014), Kyung Moon Sa, Seoul | 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) rational points; rationally connected varieties Colliot-Thélène, J.-L., Arithmetic Geometry (CIME 2007), Variétés presque rationnelles, leurs points rationnels et leurs dégénérescences, 1-44, (2011), Springer LNM | 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) Campesato, JB, An inverse mapping theorem for blow-Nash maps on singular spaces, Nagoya Math. J., 223, 162-194, (2016) | 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) Shimura curves; QM type abelian surfaces; Picard modular forms; hypergeometric functions; false elliptic curves; complex multiplication | 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) Grossberg-Karshon twisted cubes; character formulae; pattern avoidance | 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) Euler characteristic; Riemann-Roch theorem; Chern class; Galois cover; \(K\)-group; adeles; tame symbol T. Chinburg, G. Pappas and M.\ J. Taylor, Higher adeles and nonabelian Riemann-Roch, preprint (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) valuation ring; weakly unramified extension; separable field extension; flat algebra; flat morphism | 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) germs of holomorphic functions; Poincaré series | 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) hypersurfaces Arrondo E., Sendra J., Sendra J.R.: Parametric generalized offsets to hypersurfaces. J. Symbolic Comput. 23, 267--285 (1997) | 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) Calabi-Yau threefolds; Donaldson-Thomas theory; vanishing cycle sheaf | 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) automorphism group; Galois point; icosahedral group; plane curve | 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) Erdös-Ulam problem; integral distances; rational distances | 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) odd sections; even sections; ample symmetric line bundle; abelian surface; Kummer surface Bauer, Th., Projective Images of Kummer Surfaces, Math. Ann., 1994, vol. 299, pp. 155--170. | 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 stability; abelian category of coherent sheaves; Gieseker stability Rudakov A., Stability for an abelian category, J. Algebra, 1997, 197(1), 231--245 | 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) discrete valuation ring; stable reductions of curves; rigid analysis Bosch, S.; Lütkebohmert, W., Stable reduction and uniformization of abelian varieties I, Math. Ann., 270, 349-379, (1985) | 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) Birational transformations; nilpotent groups \beginbarticle \bauthor\binitsJ. \bsnmDéserti, \batitleSur les sous-groupes nilpotents du groupe de Cremona, \bjtitleBull. Braz. Math. Soc. (N.S.) \bvolume38 (\byear2007), no. \bissue3, page 377-\blpage388. \endbarticle \OrigBibText \beginbarticle \bauthor\binitsJ. \bsnmDéserti, \batitleSur les sous-groupes nilpotents du groupe de Cremona, \bjtitleBull. Braz. Math. Soc. (N.S.) \bvolume38 (\byear2007), no. \bissue3, page 377-\blpage388. \endbarticle \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) Chow motives; noncommutative motives; Kimura and Schur finiteness; motivic measures; motivic zeta functions G. Tabuada, Chow motives versus noncommutative motives, J. Noncommut. Geom. 7 (2013), no. 3, 767-786. | 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) asymptotic invariants of linear series; Newton-Okounkov bodies; ampleness and nefness of line bundles; moving Seshadri constants; jet separation Küronya, A.; Lozovanu, V., Infinitesimal Newton-Okounkov bodies and jet separation, (2015) | 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) non commutative algebraic geometry; surface; blow up; graded algebras of Gelfand-Kirillov dimension three; Abelian categories; Rees algebra; pseudo-compact rings; completion functors; derived categories; Del Pezzo surfaces; quantum version of projective three space M. Van~den Bergh, \emph{Blowing up of non-commutative smooth surfaces}, Mem. Amer. Math. Soc. \textbf{154} (2001), no.~734, x+140. \MR{1846352 (2002k:16057)} | 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) Lichtenbaum-Quillen conjecture; K-theory with coefficients; Atiyah- Hirzebruch spectral sequence; values of zeta-functions R. Thomason, The Lichtenbaum-Quillen conjecture for K/l[{\(\beta\)}-1], Proc. 1981 Conference at Univ. Western Ontario, 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) Grassmannian | 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 function field; Hasse-Witt invariants; Deuring-Shafarevich formula; Galois group; maximal unramified p-extension; p-profinite completion | 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) Karoubi-Villamayor K-functor; Bloch's formula; Chow group | 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 transformation groups; classification of normal imbeddings of spherical homogeneous spaces Pauer, Franz: Normale einbettungen von sphärischen homogenen räumen, DMV-semin. 13, 145-155 (1989) | 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) Integrable hydrodynamic type system; hydrodynamic reductions; pseudopotential A. V. Odesskii, ''A family of (2+1)-dimensional hydrodynamic type systems possessing pseudopotential,'' Selecta Math. (to appear); arXiv:0704.3577v3 [math.AP] (2007). | 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) Baldassarri, F.: Radius of convergence of \(p\)-adic connections and the Berkovich ramification locus. Math. Ann. 10.1007/s00208-012-0866-1 | 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) normalization algorithm; radical ideal; implementation; normalization of the plane cuspical curve 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. | 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) subanalytic set; \(D\)-semianalytic set; affinoid variety; 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) supergeometry; AdS/CFT correspondence; representations of Lie superalgebras; twistor theory; scattering amplitudes | 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) tautological rings; moduli spaces of curves; Chow motives; twisted commutative algebras | 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) 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). | 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) | 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) toric geometry; Fano varieties; weak Fano varieties; building sets; nested sets; graph associahedra; reflexive polytopes; graph cubeahedra; root systems | 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) Demazure models; fan; action of the Galois group; complete variety over a nonclosed field | 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) lower bounds; barriers; partial derivatives; flattenings | 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) deformation; space curve; postulation; Hilbert scheme; moduli of curves; maximal rank conjecture E. Ballico and Ph. Ellia, Beyond the maximal rank conjecture for curves in \(\mathbf P^3\) , in Space curves , Lecture Notes in Math., vol. 1266, Springer-Verlag, Berlin, 1987, pp. 1-23. | 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) modular curve; Atkin-Lehner involution; bielliptic curve; quadratic points | 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) Brill-Noether theory of vector bundles; Lazarsfeld-Mukai bundle | 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) phaseless rank; equimodular matrices; amoebas; semidefinite rank; polytopes | 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) Gawedzki, K., Suszek, R.R., Waldorf, K.: Bundle gerbes for orientifold sigma models. Adv. Theor. Math. Phys. \textbf{15}, 621-688 (2011). [arXiv:0809.5125] [math-ph] | 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) real algebraic geometry; real algebraic varieties; complexification; Smith's theory; Galois-Maximal varieties; algebraic cycles; real algebraic models; algebraic curves; algebraic surfaces; topology of algebraic varieties; regular maps; rational maps; singularities; algebraic approximation; Comessatti theorem; Rokhlin theorem; Nash conjecture; Hilbert's XVI problem; Cremona group; real fake planes | 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 model program; flips; Fano varieties; canonical ring | 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) intersection homology; Deligne sheaf; Verdier duality; Poincaré duality; blown-up cohomology | 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) Harder-Narasimhan filtrations; quasi-Tannakian categories | 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) Zariski's multiplicity conjecture; topological V-equivalent; topologically equisingular; Le number; aligned singularities Eyral C., IMPAN Lecture Notes 3, in: Topics in Equisingularity Theory (2016) | 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) Tate conjecture; abelian and abeloid varieties; \(p\)-adic fields and \(p\)-adic uniformisation; \(p\)-adic Hodge theory; filtered \((\varphi, N)\)-module; totally degenerate reduction | 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) Gorensteinness of ring of invariants of a linearly reductive group; canonical module; excellent action; determinantal rings Hochster M., The Canonical module of a ring of invariants | 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) level structures on non-constant abelian varieties; degenerate fibers; Chern class; currents Noguchi, J.: Moduli space of abelian varieties with level structure over function fields. Internat. J. Math. 2 (1991), 183--194. | 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) dressing kernels; wave functions; spectral asymptotics Carroll, R.,Inverse Scattering and Applications, Contemp. Math. Vol. 122, Amer. Math. Soc., Providence, RI, 1991, pp. 23-28;NEEDS' 90, Springer-Verlag, New York, 1991, pp. 2-5. | 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 manifold; singular meromorphic foliation | 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) \(\phi \)-module; strict ring; Dieudonné-Manin theorem; Harder-Narasimhan filtration | 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 functions; space curves; quaternary quadratic forms | 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) Blanco, R, Desingularization of binomial varieties in arbitrary characteristic. part II: combinatorial desingularization algorithm, Q. J. Math., 63, 771-794, (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) line bundle over projective toric variety | 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) irregular surfaces; classification of hyperelliptic surfaces C. Ciliberto, M. de Franchis and the theory of hyperelliptic surfaces, Studies in the history of modern mathematics, III, Rend. Circ. Mat. Palermo (2)(Suppl. 55) (1998) 45-73. | 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) polygon; algebraic curve; algebraic dependence | 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) amoeba; coamoeba; tropical 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) vector bundles; compact Riemann 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) Chipalkatti, J. V., Invariant equations defining coincident root loci, Arch. Math., 83, 5, 422-428, (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) log abundance theorem; semilog canonical surfaces; Kodaira dimension Abramovich, D.; Fong, L.-Y.; Kollár, J.; McKernan, J., Semi log canonical surfaces, Flips and abundance for algebraic threefolds, Astérisque, 211, 139-154, (2002), MR1225842 | 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) Weyl algebra; Gröbner basis; \(b\)-function; D-module Oaku, T.: Algorithms for b-functions, induced systems and algebraic local cohomology of D-modules. Proc. Japan acad. 72, 173-178 (1996) | 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 families; fundamental groups; de Rham cohomology; stacks; moduli spaces | 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) Cohen-Macaulay space; analytic spectrum; homological codimension; meromorphic function; normalization sheaf; Weierstrass algebra; local complex analysis; coherent analytic sheaves [28] R. Remmert, Local theory of complex spaces, Several complex variables, VII, Encyclopaedia Math. Sci. 74, Springer, Berlin, 1994, p. 7-96 &MR 13 | &Zbl 0808. | 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) Shafarevich complexes; noncommutative complete intersections; homology algebras E. S. Golod, ''Homologies of the Shafarevich complex and noncommutative complete intersections,'' Fund. Prikl. Mat., 5, No. 1, 85--95 (1999). | 0 |
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