text stringlengths 2 1.42k | label int64 0 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) algebraic geometric codes; minimum distance; bounds on codes; order bound; algebraic curve Beelen P.: The order bound for general algebraic geometric codes. Finite Fields Appl. 13(3), 665--680 (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) Algebraic 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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) swung surfaces; revolution surfaces; real and complex surfaces; rational parametrization; ultraquadrics Andradas, Carlos; Recio, Tomás; Sendra, J. Rafael; Tabera, Luis-Felipe; Villarino, Carlos: Reparametrizing swung surfaces over the reals, Appl. algebra eng. Commun. comput. 25, No. 1-2, 39-65 (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) monads; stable bundles; hypersurfaces; three-folds 10.1007/s00574-007-0067-9 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) arithmetic function; number of factorizations of an integer; group of rational points; 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) non-archimedean valuation; Mumford curve; branched cover of the projective line van der Put, M.; Voskuil, H. H., Discontinuous subgroups of \(\operatorname{PGL}_2(K)\), J. Algebra, 271, 234-280, (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) affine curves; irregular value J. Gwozdziewicz and A. Ploski, On the singularities at infinity of plane algebraic curves, Rocky Mountain J. Math. 32 (2002), 139--148. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) index; bordism; manifold; Thom's isomorphism; resolving singularities; submanifolds; signature; characteristic classes 19.D.~Sullivan, René Thom's work on geometric homology and bordism. Bull. Am. Math. Soc. 41, 341-350 (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) twisted homogeneous coordinate ring; torsion modules M. Artin and M. Van den Bergh, ''Twisted homogeneous coordinate rings,''J. Algebra,133, No. 2, 249--271 (1990). | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) \(A\)-infinity algebras; Ext-algebras; Koszul dualities; projective complete intersections; derived categories; free resolutions; differential graded algebras; Clifford algebras; coherent sheaves Baranovsky, V.: BGG correspondence for projective complete intersections. Int. Math. Res. Not. \textbf{2005}(45), 2759-2774 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) orbifold; flop; Ruan cohomology Chen, B., Li, A., Zhang, Q., et al.: Singular symplectic flops and Ruan cohomology. Topology, 48, 1--22 (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) algebraic groups; anisotropic groups; projective spaces; simple connected groups; Zariski topology; maximal torus; root system; group schemes B. Weisfeiler, ''On abstract homomorphisms of anisotropic algebraic groups over real-closed fields,'' J. Algebra,60, No. 2, 485--519 (1979). | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) duality pairing; higher Chow groups; complete intersections | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) affine Grassmannian; Langlands dual group; Toda lattice Bezrukavnikov, R.; Finkelberg, M., \textit{equivariant Satake category and Kostant-Whittaker reduction}, Mosc. Math. J., 8, 39-72, (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) multiplihedron; associahedron; nodal disk; metric tree; moment polytope; moduli spaces of stable quilted discs; colored metric ribbon trees; stable scaled marked curves S. Ma'u, C. Woodward, \textit{Geometric realizations of the multiplihedra}, Compos. Math. \textbf{146} (2010), no. 4, 1002-1028. | 0 |
Pimentel, F, Algorithm for computing the 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 or analytic subset of the manifold of all lines in complex n-space; line complexes; decomposition of admissible line complexes; critical points; Grassmannians; subsets of Grassmann bundles as differential equations K. Maius, The structure of admissible line complexes in \(\mathbbCP^n\) , Trans. Mosc. Math. Soc. 39 (1981), 195-226. | 0 |
Pimentel, F, Algorithm for computing the 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 curves; special linear series; Brill-Noether 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) sums of units; theorem of Picard-Borel; rational points; Hilbert's irreducibility theorem; finiteness of number of holomorphic mappings; quasiprojective spaces; de Franchis theorem | 0 |
Pimentel, F, Algorithm for computing the 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 varieties; Tate modules Zarhin Yu.G., Homomorphisms of abelian varieties over geometric fields of finite characteristic, J. Inst. Math. Jussieu, 2013, 12(2), 225--236 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Noether-Lefschetz locus; algebraic cycle | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) variation of Hodge structures; vanishing theorem | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Zorich-Kontsevich conjecture; Lyapunov exponents of the Teichüeller flow on the moduli space; compact Riemann surface Avila, A., Viana, M.: Dynamics in the moduli space of abelian differentials. Port. Math., 62, 531--547 (2005) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) fibre product of Noetherian rings; prime ideals of a fibre product of rings; Noetherian schemes DOI: 10.1017/S0305004100062794 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) A. Surroca. \textit{Sur l'effectivité du théorème de Siegel et la conjecture abc}. J. Number Theory, \textbf{124} (2007), 267-290. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) DOI: 10.1088/0305-4470/39/45/027 | 0 |
Pimentel, F, Algorithm for computing the 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 with boundary; moduli space; KdV equations A. Buryak, \textit{Equivalence of the open KdV and the open Virasoro equations for the moduli space of Riemann surfaces with boundary}, arXiv:1409.3888 [INSPIRE]. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Sarkisov program; Mori fiber space Hacon, C. D.; Mckernan, J., \textit{the sarkisov program}, J. Algebraic Geom., 22, 389-405, (2013) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) principal bundles; 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) elliptic curves; GLV-GLS method; scalar multiplication; twisted Edwards curve; side-channel protection; multicore computation Longa, P., Sica, F., Smith, B.: Four-dimensional Gallant-Lambert-Vanstone scalar multiplication. In: Asiacrypt 2012, pp. 718--739 (2012). Citations in this document: {\S}1.1 | 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) algebraic cycle; iterated integral; hypergeometric function | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) cohomology groups of an analytic line bundle over a complex torus | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) AdS/CfT; non-planar diagrams; dilatation operator Kimura, Y., Non-planar operator mixing by Brauer representations, Nucl. Phys., B 875, 790, (2013) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) phylogenetics; configuration spaces; associahedron; tree spaces S. Devadoss and J. Morava, \textit{Navigation in tree spaces}, Adv. Appl. Math., 67 (2015), pp. 75--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) elliptic fibrations; \(K3\) surfaces; lattices; symplectic automorphisms Garbagnati A and Sarti A 2009 Elliptic fibrations and symplectic automorphisms on K3 surfaces \textit{Commun. Algebra}37 3601--31 | 0 |
Pimentel, F, Algorithm for computing the 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; arithmetically Cohen-Macaulay bundles Tripathi, A., Splitting of low-rank ACM bundles on hypersurfaces of high dimension, Commun. Algebra, 44, 3, 1011-1017, (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) | 0 |
Pimentel, F, Algorithm for computing the 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) Naor-Reingold pseudo-random function; linear complexity; elliptic curves Cruz, M.; Gómez, D.; Sadornil, D., On the linear complexity of the Naor-Reingold sequence with elliptic curves, Finite Fields Appl., 16, 329-333, (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) \(K3\) surface; non-symplectic automorphism Shingo Taki, Classification of non-symplectic automorphisms of order 3 on \?3 surfaces, Math. Nachr. 284 (2011), no. 1, 124 -- 135. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Hochster's theta invariant; isolated hypersurface singularity; Hodge-Riemann bilinear relations; Tor-rigidity; Chern character; étale cohomology; singular cohomology; Hilbert series Moore, W. F.; Piepmeyer, G.; Spiroff, S.; Walker, M. E., \textit{hochster's theta invariant and the Hodge-Riemann bilinear relations}, Adv. Math., 226, 1692-1714, (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) Artin stacks; geometric invariant theory; moduli spaces J. Alper, Good moduli spaces for Artin stacks, preprint (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) uniform distribution subgroup; Brauer group Greenfield, G. R.; Mollin, R. A.: The uniform distribution group of a commutative ring. J. algebra 108, 179-187 (1987) | 0 |
Pimentel, F, Algorithm for computing the 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 family of submanifolds; integral geometry; admissible double fibration; covering map A. B. Goncharov, Admissible families of \(k\)-dimensional submanifolds , Dokl. Akad. SSSR 300 (1988), no. 3, 535-539. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) A. O. Smirnov, ''The elliptic solutions of integrable nonlinear equations,'' Mat. Zametki [Math. Notes], 46 (1989), no. 5, 100--102. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) monomial ideal; toric algebra; Hilbert scheme; local cohomology; multigraded polynomial rings E. Miller and B. Sturmfels, \textit{Combinatorial commutative algebra}, Graduate Texts in Mathematics volume 227, Springer, Germany (2005). | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) hyperplane arrangements; minimality; local system cohomology Yoshinaga, M., Minimality of hyperplane arrangements and basis of local system cohomology, (Singularities in geometry and topology, IRMA lect. math. theor. phys., vol. 20, (2012), Eur. Math. Soc. Zürich), 345-362 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) supersingular abelian varieties; Shimura varieties; orthogonal 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) noncommutative algebraic geometry; spectrum of an abelian category; localizations; canonical topologies A. L. Rosenberg, Noncommutative local algebra, Geometric and Functional Analysis 4 (1994), 545--585. | 0 |
Pimentel, F, Algorithm for computing the 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) Picard-Lefschetz theory; \(\mathbb{C}^\ast\)-action; Fukaya category; Floer cohomology; symplectic manifold P. Seidel, Picard-Lefschetz theory and dilating \(\mathbb{C}^{*}\)-actions, J. Topol. 8 (2015), no. 4, 1167--1201. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Thom-Sebastiani Theorem; Künneth formula; nearby cycle; vanishing topos; convolution Illusie, L.: Around the Thom-Sebastiani theorem, with an appendix by Weizhe Zheng. Manuscr. Math. (2016). 10.1007/s00229-016-0852-0 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) nonnormal singularities; simultaneous normalisation; small modifications | 0 |
Pimentel, F, Algorithm for computing the 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) root number; fibers of elliptic surfaces E. Manduchi. Root Numbers of fibers of elliptic surfaces. Compositio Math., 99(1) (1995), 33--58. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) symplectic groups; invariant subfield Chu, H.: Supplementary note on ''rational invariants of certain orthogonal and unitary groups''. Bull. London math. Soc. 29, 37-42 (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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Noether-Lefschetz theorem; nontrivial complete intersection curves contained in a general hypersurface; Hilbert schemes; Hilbert functions Szabó, E.: Complete intersection subvarieties of general hypersurfaces, Pacific J. Math. 175, No. 1, 271-294 (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) formally real field; regularly r-closed fields; pseudo-real closed fields; ordered fields; existentially closed; axiomatizable; irreducible variety; PRC-field Basarab, Serban A.: Definite functions on algebraic varieties over ordered fields. Rev. roumaine math. Pures appl. 29, 527-535 (1984) | 0 |
Pimentel, F, Algorithm for computing the 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 variety; reductive group; positive polynomial functions; quotient variety; Borel measure; moment problems J. Cimpric, S. Kuhlmann, and C. Scheiderer, \textit{Sums of squares and moment problems in equivariant situations}, Trans. Amer. Math. Soc., 361 (2009), pp. 735--765. | 0 |
Pimentel, F, Algorithm for computing the 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 ampleness; spannedness; embedding; abelian surfaces; ample line bundle; effective divisor Terakawa, H., The \textit{k}-very ampleness and \textit{k}-spannedness on polarized abelian surfaces, Math. Nachr., 195, 1, 237-250, (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) DOI: 10.1016/j.crma.2006.11.033 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Higgs bundle; principal bundle; Morse flow Biswas I., Wilkin G.: Morse theory for the space of Higgs G-bundles. Geom. Dedicata 149, 189--203 (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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Lech problem; \(L\)-algebras; local 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) Drinfeld modules; local shtukas; complex multiplication; Artin \(L\)-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) | 0 |
Pimentel, F, Algorithm for computing the 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; scalar multiplication; point arithmetic; double-base number system | 0 |
Pimentel, F, Algorithm for computing the 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-Hurwitz formula; virtual tangent bundle; homology theory; generalized monoidal transformation; stratified pseudomanifold; signature; Chern-Schwartz-MacPherson class; homology L-class; cohomology signature class; blowing-up process | 0 |
Pimentel, F, Algorithm for computing the 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) elliptic divisibility sequences; elliptic nets; division polynomial; Edwards 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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) local field; categorical characterization | 0 |
Pimentel, F, Algorithm for computing the 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 crepant resolutions; Hibi rings; class 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) Łojasiewicz exponent near the fibre; Puiseux expansion at infinity Vui H.H., Duc N.H.: On the Łojasiewicz exponent near the fibre of polynomial mappings. Ann. Polon. Math. 94, 43--52 (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) F-theory; M-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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) isolated hypersurface singularity; Lie algebra; moduli algebra | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) ordinary K3 surfaces; 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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Jordan property; automorphisms of projective 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) Kähler-Einstein metrics; birational geometry; b-stability; Chow invariant Donaldson, S. K.: b-Stability and blow-ups. Proc. Edinb. Math. Soc. (2) \textbf{57}(1), 125-137 (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) analytic stack; higher stack; Grauert's theorem; analytification; GAGA; rigid analytic geometry; Berkovich space; infinity category M. Porta and T.\ Y. Yu, Higher analytic stacks and GAGA theorems, 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) | 0 |
Pimentel, F, Algorithm for computing the 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 of stable vector bundles; elliptic surface; singularities; obstruction; Kodaira dimension | 0 |
Pimentel, F, Algorithm for computing the 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) Jacobian conjecture; Hadamard's theorem; global inversion theorem Balreira, E., Foliations and global inversion, Comment. Math. Helv., 85, 73-93, (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) algebraic geometry textbook; algebraic variety; cohomology; plane curves; local 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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Berkovich space; polydisc; tame ramification; graded commutative algebra Ducros, A., Toute forme modérément ramifiée d'un polydisque ouvert est triviale, Math. Z., 273, 331-353, (2013) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Grothendieck ring; motivic zeta function Larsen, M.; Lunts, V. A., \textit{motivic measures and stable birational geometry}, Mosc. Math. J., 3, 85-95, (2003) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) DOI: 10.4171/RSMUP/121-10 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) connection; relative moduli spaces; vanishing curvature; fundamental group of the Riemann surface Ramadas, T. R.: Faltings construction of the K -- Z connection. Comm. math. Phys. 196, 133-143 (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) lines, grids; Hilbert function Guida M., Orecchia F.: Algebraic properties of grids of projective lines. J. Pure Appl. Algebra 208, 603--615 (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) perfectoid space; Galois group; nondiscrete valuation; perfectoid \(K\)-algebra; rational subset | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) main conjecture; universal elements; local constants; twist operators; \(\mathbb{Z}_p\)-module | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) regular sequence; monomial conjecture; local ring; Koszul homology; modules of generalized fractions; determinantal map; poor M-sequences; local cohomology; Lichtenbaum-Hartshorne theorem O'Carroll L, Generalized fractions, determinantal maps, and top cohomology modules, J. Pure Appl. Algebra 32(1) (1984) 59--70 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) invariant theory Vinberg, È.~B., On invariants of a set of matrices, J. Lie Theory, 6, 2, 249-269, (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) Kummer surfaces; resolving singularities of the quotient of a complex torus by a finite abelian group; Euler numbers; toroidal desingularization; string J. Halverson, C. Long and B. Sung, \textit{Algorithmic universality in F-theory compactifications}, \textit{Phys. Rev.}\textbf{D 96} (2017) 126006 [arXiv:1706.02299] [INSPIRE]. | 0 |
Subsets and Splits
No community queries yet
The top public SQL queries from the community will appear here once available.