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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) \(\ell\)-adic cohomology; perverse sheaves; decomposition theorem; independence of \(\ell\); perverse compatible 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) mixed Frobenius structure; quantum cohomology; local mirror symmetry | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) quartic surface; Hilbert symbol | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) tropical geometry; quartic curves; bitangent lines; Jacobians; moduli 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) rational 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) absolute Galois group; function field; anabelian geometry Szamuely, T., Groupes de Galois de corps de type fini (d'après pop), Astérisque, 294, 403-431, (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) rational points; hyperelliptic curves; Frobenius class | 0 |
Pimentel, F, Algorithm for computing the 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) multilinear algebra; tensor calculus; computational aspects of algebraic; 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) arithmetic dynamics; arboreal Galois representations; iterated Galois 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) S. Fiedler-Le Touzé and S. Yu. Orevkov, A flexible affine \?-sextic which is algebraically unrealizable, J. Algebraic Geom. 11 (2002), no. 2, 293 -- 310. | 0 |
Pimentel, F, Algorithm for computing the 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) sandpile groups; critical groups; Jacobians of 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) SUSY quantum mechanics; mirror image potentials; isospectrality; enantiomers | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) abundance; termination of MMP; lc pairs; MMP with scaling | 0 |
Pimentel, F, Algorithm for computing the 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 group schemes; proalgebraic groups; Tannakian categories; representation 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) hyperbolic curve; group of biholomorphic automorphisms; fundamental group Shabat, GB, Local reconstruction of complex algebraic surfaces from universal coverings, Funktsional. Anal. i Prilozhen., 17, 90-91, (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) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) space curve on a smooth cubic surface; maximal rank curves; extremal curves; Hilbert function DOI: 10.1007/BF01762395 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) classification of Fano-Enriques threefolds Conte, A.: On the nature and the classification of Fano-Enriques threefolds. In: Proceedings of the Hirzebruch 65 Conference on Algebraic Geometry (Ramat Gan, 1993), Israel Math. Conf. Proc. 9, Bar-Ilan Univ., Ramat Gan, 1996, 159-163. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Frobenius manifolds; cohomological field theory; commutativity equation; Losev-Manin compactification; Givental's group action; Kadomtsev-Petviashvili hierarchy Shadrin, S., Zvonkine, D.: A group action on Losev--Manin cohomological field theories. arXiv:0909.0800v1, 1--21 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Konopelchenko, B.; Martí nez Alonso, L.; Medina, E., Spectral curves in gauge/string dualities: integrability, singular sectors and regularization, J. Phys. A: Math. Theor., 46, (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) equivariant compactification; symmetric varieties; character sheaves; finite groups of Lie type | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) holomorphic vector bundle; Stein manifold; quasi-affine 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) stable curves of non compact type; limits of Weierstrass points on reducible curves Coppens, Limit Weierstrass schemes on stable curves with 2 irreducible components, Atti Accad. Naz. Lincei 9 pp 205-- (2001) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) rigidity; infinitesimal deformations of a two-dimensional cusp singularity [Be 1] K. Behnke. Infinitesimal deformations of cusp singularities. Math. Ann. 265, 407--422, 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) hyperbolic fibre space; higher dimensional analogue of Mordell's conjecture for curves; hyperbolic manifolds; algebraic families of hyperbolic varieties; Mordell's conjecture over function fields Noguchi, J.Hyperbolic fiber spaces and Mordell's conjecture over function fields, Publ. Research Institute Math. Sciences Kyoto University21, No. 1 (1985), 27--46. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) basic semi-algebraic set; quadratic functions; sign conditions; quadratic-ring equivalent Lombardi, H.; Mnev, N.; Roy, M. -F.: The positivstellensatz and small deduction rules for systems of inequalities. Math. nachr. 181, 245-259 (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) Itoyama, H.; Oota, T.; Yoshioka, R., 2\textit{D-}4\textit{D connection between q-Virasoro/W block at root of unity limit and instanton partition function on ALE space}, Nucl. Phys., B 877, 506, (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) | 0 |
Pimentel, F, Algorithm for computing the 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 modules; Sklyanin algebra; graded module; Hilbert series; Gelfand-Kirillov dimension Levasseur, Thierry; Smith, S. Paul, Modules over the \(4\)-dimensional Sklyanin algebra, Bull. Soc. Math. France, 121, 1, 35-90, (1993) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) diagonal equations; cyclotomic classes; cyclotomic numbers; number of points on finite diagonal curves; 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) surface singularity; deformation; modality; pluri-genus; Milnor number; Tjurina number Okuma T. The second pluri-genus of surface singularities. Compos Math, 1998, 110: 263--276 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Spec; depth; Cohen-Macaulay local 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) | 0 |
Pimentel, F, Algorithm for computing the 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) intersection theory; finite fields; cohomological methods | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) key distribution; secure communication; ad hoc networks; privacy; graph theory; block designs; Steiner systems; combinatorics Y. Desmedt, N. Duif, H. van Tilborg, and H. Wang, ''Bounds and constructions for key distribution schemes,'' Adv. Math. Commun., vol. 3, no. 3, pp. 273--293, Aug. 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) Generalized complex geometry; T-duality; Courant reduction; D-brane G.R. Cavalcanti and M. Gualtieri, \textit{Generalized complex geometry and T-duality}, arXiv:1106.1747 [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) quotient of complex surface under the action of automorphism group; Enriques surfaces Mukai, [Mukai and Namikawa 84] S.; Namikawa, Y., Automorphisms of Enriques surfaces which act trivially on the cohomology groups., \textit{Invent. Math.}, 77, 383-397, (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) Tate pairing; robust codes; fault-tolerant | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) polyhedron | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) canonical model of compact Kähler manifolds; canonical ring; effective divisor; log-terminal singularity Nakayama, N.: The singularities of the canonical model of complex K?hler manifolds. Math. Ann.280, 509-512 (1988) | 0 |
Pimentel, F, Algorithm for computing the 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 space of semistable rank 2 bundles; complete surface; Chern class Hulek, Sur l'espace de modules des faisceaux stables de rang 2, de classes Chern (0,3) sur P2, Ann. Inst. Fourier 39 pp 251-- (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) confinement; duality in gauge field theories; solitons monopoles and instantons Chatterjee, C.; Lahiri, A., Flux dualization in broken SU(2), JHEP, 02, 033, (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) Knizhnik-Zamolodchikov equations; Hitchin connection; conformal blocks; non-abelian theta functions [3] Prakash Belkale, &Unitarity of the KZ/Hitchin connection on conformal blocks in genus 0 for arbitrary Lie algebras&#xJ. Math. Pures Appl. (9)98 (2012) no. 4, p.~367Article | &MR~29 | &Zbl~1277. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Rodier, F.; Sboui, A., LES arrangements minimaux et maximaux d'hyperplans dans \(\mathbb{P}^n(\mathbb{F}_q)\), C. R. math. acad. sci. Paris, 344, 287-290, (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) divisor of a rational normal scroll; minimal free resolution; arithmetically Cohen-Macaulay E. Park, On syzygies of divisors on rational normal scrolls, Math. Nachr. 287 (2014), no. 11-12, 1383--1393. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Y. Hu, A compactification of open varieties, Trans. Amer. Math. Soc. 355 (2003), 4737--4753. JSTOR: | 0 |
Pimentel, F, Algorithm for computing the 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 structures; real Campedelli surfaces; deformation type; DIF=DEF problem Kulikov, Vi.k S.; Kharlamov, V. M., Surfaces with DIF\(###\)DEF real structures, Izv. Ross. Akad. Nauk, Ser. Mat., 70, 135-174, (2006) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) varieties over a finite fields; zeta functions; bielliptic surfaces; albanese mapping; elliptic curves; étale cohomology; Frobenius morphism; isogeny class Рыбаков, С. Ю., Дзета-функции биэллиптических поверхностей над конечными полями, Матем. заметки, 83, 2, 273-285, (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) formal deformation; singular deformation; Lie 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) D-brane; F-theory; superpotential; mirror symmetry; Calabi-Yau manifold; Ooguri-Vafa invariant | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Gorenstein defect category; triangular matrix algebra; recollement; Gorenstein 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) categorification; quantum group; quantum \(sl(n)\); iterated flag variety; 2-representation; 2-category Khovanov, M.; Lauda, A., A categorification of quantum \(\mathfrak{sl}_n\), Quantum Topol., 1, 1, 1-92, (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) dimer models; superconformal field theories; bipartite graphs; quivers with relations; McKay quivers; moduli spaces; representations of quivers; crepant resolutions; quotient singularities A. Ishii and K. Ueda, \textit{On moduli spaces of quiver representations associated with dimer models}, arXiv:0710.1898. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) formal principle; exceptional divisor; algebraic versal deformations Popescu, D.; Roczen, M.: Algebraization of deformations of exceptional couples. Rev. roumaine 33, No. 3, 251-260 (1988) | 0 |
Pimentel, F, Algorithm for computing the 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) harmonic spinors; index Kotschick, D.: Non-trivial harmonic spinors on generic algebraic surfaces. Proc. amer. Math. soc. 124, No. 8, 2315-2318 (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) linear derivations; Lie algebra; formal differential operators; tensor algebra; Gelfand-Kirillov dimension; symmetric algebra; smooth affine variety; global differential operators S. P. Smith, Gel\(^{\prime}\)fand-Kirillov dimension of rings of formal differential operators on affine varieties, Proc. Amer. Math. Soc. 90 (1984), no. 1, 1 -- 8. | 0 |
Pimentel, F, Algorithm for computing the 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 genus curves; visualisation; Brauer-Manin obstruction; Shafarevich-Tate group A. Arnth-Jensen , E.V. Flynn , Supplement to: Non-trivial \(\Sha\) in the Jacobian of an infinite family of curves of genus 2 . Available at: http://people.maths.ox.ac.uk/flynn/genus2/af/artlong.pdf [2] N. Bruin , E.V. Flynn , Exhibiting Sha[2] on Hyperelliptic Jacobians . J. Number Theory 118 ( 2006 ), 266 - 291 . MR 2225283 | Zbl 1118.14035 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Bogomolov property; elliptic curve; Weil height; Néron-Tate height | 0 |
Pimentel, F, Algorithm for computing the 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 Galois extensions; relative Brauer groups; cyclic extensions; indecomposable division algebras of prime exponent; central simple algebras; Brauer class; rational function 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) graded rings; noncommutative geometry D. Rogalski and J. J. Zhang, Canonical maps to twisted rings, Mathematische Zeitschrift 259 (2008), 433--455. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) commutative algebra; integral domains; valuations; Hahn field; minimal ring extension; maximal subalgebra; algebraically closed field; birational geometry; spectrum of a 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) homotopy \(K\)-theory; noetherian schem; Krull dimension Kerz, Moritz; Strunk, Florian, On the vanishing of negative homotopy \(K\)-theory, J. Pure Appl. Algebra, 221, 7, 1641-1644, (2017) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) F. Zerbini, \textit{Single-valued multiple zeta values in genus 1 superstring amplitudes}, arXiv:1512.05689 [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) abelian surfaces; nef cone; elliptic curves; volume 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) ramified covering of Dedekind schemes; second Stiefel-Whitney class Hélène Esnault, Bruno Kahn, and Eckart Viehweg, Coverings with odd ramification and Stiefel-Whitney classes, J. Reine Angew. Math. 441 (1993), 145 -- 188. | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) efficient software implementation; cryptographic engineering; elliptic curve cryptography; finite field arithmetic Aranha, D. F.; Dahab, R.; López, J.; Oliveira, L. B., Efficient implementation of elliptic curve cryptography in wireless sensors, Adv. Math. Commun., 4, 2, 169-187, (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) polarized K3 surfaces; reflexive pairs; Fourier-Mukai transformation; coarse moduli space Bartocci, C.; Bruzzo, U.; Hernández~Ruipérez, D., Moduli of reflexive \(K 3\) surfaces, (Complex analysis and geometry (Trento, 1995), Pitman res. notes math. ser., vol. 366, (1997), Longman, Harlow), 60-68 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) semistable degenerate orthogonal bundles; semistable symplectic bundles; vector bundles on curve; ramified covering; moduli spaces; quadratic forms; symplectic forms Bhosle U, Degenerate symplectic and orthogonal bundles on \(\mathbb{P}\)1,Math. Ann. 267 (1984) 347--364 | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Halle, LH; Nicaise, J, The Néron component series of an abelian variety, Math. Ann., 348, 749-778, (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) Kuniba, Atsuo and Sergeev, Sergey, Tetrahedron equation and quantum {\(R\)} matrices for spin representations of {\(B^{(1)}_n\)}, {\(D^{(1)}_n\)} and {\(D^{(2)}_{n+1}\)}, Communications in Mathematical Physics, 324, 3, 695-713, (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) homeomorphism type; complete intersection; Pontryagin classes; Euler characteristic | 0 |
Pimentel, F, Algorithm for computing the 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 projective algebraic variety; cycle; divisor; monodromy representation Gennaro, V; Franco, D, Monodromy of a family of hypersurfaces, Ann. Sci. Éc. Norm. Supér. 4e Série, 42, 517-529, (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) F-form; moduli space of pointed stable curves; rationality; twisted form of 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) Ihara representation; mod \(l\) Milnor invariants; dilogarithmic mod \(l\) Heisenberg coverings; triple power residue symbols | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) passport of a snake | 0 |
Pimentel, F, Algorithm for computing the 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) compact Riemann surfaces; vector bundles; ruled manifold; extension; fundamental group; representation; 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) V. S. Moldavskiĭ, Moduli of elliptic curves and rotation numbers of diffeomorphisms of the circle, Funct. Anal. Appl., 35, 234, (2001) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) hypercohomology; truncated twisted holomorphic de Rham complex; Leray-Hirsch theorem; Künneth theorem; Poincaré-Serre duality theorem; blowup formula | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) containment problem; linear minimal free resolution; resurgence; symbolic power | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) flag varieties; secant varieties; identifiability | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Hodge number; complete intersection; nodal threefold; Calabi-Yau; defect | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Gaussent, S.: The fibre of the Bott-Samelson resolution. Indag. Math. N. S. \textbf{12}(4), 453-468 (2001) | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) Witt vectors; de Rham-Witt complex; perfectoid 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) moduli space of flat bundles; irregular singularities; de Rham 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) (symmetric) Kronecker coefficients; non saturation; geometric complexity theory; orbit closure of the determinant | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) complete intersection; Hadamard product; star configuration; Gorenstein | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) loops; algebraic groups; non-associative algebras; cogroups; coloops; formal diffeomorphisms | 0 |
Pimentel, F, Algorithm for computing the 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) Algebraic geometry; Proceedings; Conference; Berlin | 0 |
Pimentel, F, Algorithm for computing the moduli space of pointed Gorenstein curves with Weierstrass gap sequence \(1, 2, \dots , g-2, {\lambda }, 2g-3\), J. Algebra, 276, 280-291, (2004) cusp singularities; Rational singularities; plurigenera; normal singularities | 0 |
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