text stringlengths 2 1.42k | label int64 0 1 |
|---|---|
zero cycles; Chow group of algebraic cycles; Hodge structure higher dimensional projective varieties; vector bundles; zero-cycles; configurations of points; Lie algebras; Higgs bundles I. Reider, Configurations of points and strings , J. Geom. Phys. 61 (2011), 1158-1180. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure quotient of SL(2); action of algebraic group Ewa Duma, On \?\?(2)-actions without 3-dimensional orbits, Colloq. Math. 58 (1990), no. 2, 233 -- 241. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure action of reductive algebraic group; algebraic homogeneous vector bundles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure \(l\)-adic Abel-Jacobi map; group of codimension-\(n\) cycles modulo rational equivalence; filtration; \(l\)-adic étale cohomology; cycle map; function field in one variable W. Raskind, ''Higher \(l\)-adic Abel-Jacobi mappings and filtrations on Chow groups,'' Duke Math. J., vol. 78, iss. 1, pp. 33-57, 1995. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Tjurina number; isolated complete intersection singularity; Milnor number; miniversal deformation; Hodge number; mixed Hodge structure; local cohomology group DOI: 10.1007/BF01455800 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure rational representation of a linear algebraic group; pre-homogeneous vector space; zeta distributions Teranishi, Y.: The functional equation of zeta distributions associated with prehomogeneous vector spaces (G\tilde{}, p\tilde{}, M (n, C)). Nagoya math. J. 99, 131-146 (1985) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure cubic 8-fold; Hodge conjecture for codimension 4; algebraic cycles Terasoma, Hodge conjecture for cubic 8-folds, Math. Ann. 288 pp 9-- (1990) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure plane algebraic curves; characteristic variety; fundamental group of the complement to the curve A. Libgober, Characteristic varieties of algebraic curves, Applications of algebraic geometry to coding theory, physics and computation (Eilat, 2001) NATO Sci. Ser. II Math. Phys. Chem., vol. 36, Kluwer Acad. Publ., Dordrecht, 2001, pp. 215 -- 254. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure real algebraic sets; compact surface; first homology group; not generated by algebraic cycles Wojciech Kucharz, On homology of real algebraic sets, Invent. Math. 82 (1985), no. 1, 19 -- 25. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure threefolds; pencil of del Pezzo surfaces; exceptional curves; Prym-Tyurin variety; intermediate Jacobian; Chow group Kanev V., Intermediate Jacobians and Chow groups of threefolds with a pencil of del Pezzo surfaces, Ann. Mat. Pura Appl., 1989, 154, 13--48 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure infinitesimal Torelli problem; generic Torelli problem; infinitesimal variation of Hodge structure Ivinskis, K. : Torellisätze für zyklische Überlagerungen . Dissertation Bonn 1990, Preprint 90-24, Max-Planck-Institut für Mathematik Bonn (1990). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; principally polarized abelian variety; jacobian of a general curve | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure representation theory; reductive algebraic groups; simple G-modules; highest weights; character formula; Weyl's formula; affine group schemes; injective modules; injective resolutions; derived functors; Hochschild cohomology groups; hyperalgebra; split reductive group schemes; Steinberg's tensor product theorem; irreducible representations; Kempf's vanishing theorem; Borel-Bott-Weil theorem; characters; linkage principle; dominant weights; filtrations; Steinberg modules; cohomology ring; ring of regular functions; Schubert schemes; line bundles [6] Jantzen J.\ C., Representations of Algebraic Groups, Academic Press, Orlando, 1987 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure rank of normal homogeneous space; spherical orbits; complexity of homogeneous space; reductive algebraic group D. Panyushev, \textit{Complexity and nilpotent orbits}, Manuscripta Math. \textbf{83} (1994), 223-237. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure birational classification; actions of algebraic group; locally free actions; sections | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mirror symmetry; Gromov-Witten invariants; sigma models; variations of the Hodge structure; quantum cohomology; string theory; string compactification; Calabi-Yau threefolds D. Morrison, Mirror symmetry and rational curves on quintic \(3\)-folds: A guide for mathematicians , preprint, Duke University, DUK-M-90-01, July 1991. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Lie group with a compatible real algebraic structure; locally Nash group; algebraic addition theorem; semialgebraic groups Madden J., Stanton C.: One-dimensional Nash groups. Pac. J. Math. 154(2), 331--344 (1992) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure homogeneous two dimensional complex manifolds; action of real Lie group of holomorphic automorphisms; CR-structure; Heisenberg group [OR] Oeljeklaus, K., Richthofer, W.: Homogeneous complex surfaces. Math. Ann.268, 273--292 (1984) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure narrow Mordell-Weil lattice; group of rational points on an elliptic curve; Weyl groups as Galois groups; sphere packing; algebraic equations; inverse Galois problem; Kodaira-Néron model; height pairing; Néron- Severi group; rational elliptic surface | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure geometric genus; irregularity; rational equivalence classes of zero cycles; pseudo-rational surface; very good reduction Coombes, K, The arithmetic of zero cycles on surfaces with geometric genus and irregularity zero, Math. Ann., 291, 429-452, (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure three dimensional affine space; linearizability of algebraic group actions; geometric invariant theory J.-P. Furter, H. Kraft, \textit{On the geometry of the automorphism group of affine n-space}, 2013, to appear. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge conjecture on algebraic cycles; \(K3\) surface; smooth projective model | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Manin-Drinfeld theorem; modular curve; Picard group; mixed Hodge structure Elkik, R., Le théorème de Manin-Drinfeld, Séminaire sur LES pinceaux de courbes elliptiques, Paris, 1988, Astérisque, 183, 59-67, (1990) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chern classes; algebraic cycles; intersection numbers; arithmetic schemes; Euler characteristic; family of curves; Swan conductor; intersection number Bloch, S., Cycles on arithmetic schemes and Euler characteristics of curves, Proceedings of Symposia in Pure Math. AMS46 (1987), 421--450 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure arithmetic of rationally connected varieties; R-equivalence; zero-cycles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure reductive connected algebraic group; unipotent element; irreducible components; variety of Borel subgroups; irreducible representations; permutation representation; Levi decomposition; irreducible cuspidal representation; Coxeter group; generalized Springer correspondence; special orthogonal groups; intersection cohomology G. Lusztig, Intersection cohomology complexes on a reductive group, Invent. Math. 75 (1984), no. 2, 205-272. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure equivariant cohomology; real algebraic variety; étale cohomology; Witt group of a real Enriques surface V. A. Krasnov, ''Étale and equivariant cohomology of a real algebraic variety,'',Izv. Ross. Akad. Nauk Ser. Mat., [Russian Acad. Sci. Izv. Math.] (to appear)''. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure polarized variations of the Hodge structures; Calabi-Yau families; family of elliptic curves; motivic mixed Hodge structure; Calabi-Yau three-folds Deligne, P.: \textit{Local behavior of Hodge structures at infinity}. In: Mirror symmetry, II. AMS/IP Stud. Adv. Math., Vol. 1, Providence, RI: Amer. Math. Soc., 1997, pp. 683-699 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure abelian varieties; Chow ring; zero-cycles; covering gonality | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure lower bound; logarithms of algebraic points on an algebraic group; simultaneous independent linear forms Hirata-Kohno, N.: Approximations simultanées sur LES groupes algébriques commutatifs. Compositio math. 86, 9-96 (1993) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure self-products of varieties; Albanese variety; \(K3\)-surfaces; Bloch's conjecture; zero-cycles; skew zero-cycles; Kummer surface C. Voisin, ''Remarks on zero-cycles on self-products of varieties'' in Moduli of Vector Bundles (Sanda, 1994; Kyoto 1994), Lecture Notes Pure Appl. Math. 179, Dekker, New York, 1996, 265--285. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; intermediate Jacobians; regular homomorphisms; relative Abel-Jacobi maps; field of definition | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Ulm invariants; Brauer group of algebraic function fields over global fields Fein, B.; Schacher, M.: Brauer groups of algebraic function fields. J. algebra 103, 454-465 (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bloch filtration; pure motives; Hodge conjecture; category of mixed motives; category of geometric mixed Hodge structures; category of mixed Hodge structure of geometric origin; absolute Hodge cohomology; Deligne cohomology; mixed Hodge modules of geometric origin Saito, M., \textit{Hodge conjecture and mixed motives. I}, Complex geometry and Lie theory (Sundance, UT, 1989), 283-303, (1991), American Mathematics Society, Providence, RI | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure one-motif; Picard variety; Néron-Severi group; polarized mixed Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure filtration of a module; finitely generated module; cycle class; Chow group; Grothendieck group; Riemann-Roch map Chan, C.-Y.: Filtrations of modules, the Chow group, and the Grothendieck group. J. Algebra \textbf{219}(1), 330-344 (1999) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure exterior power; algebra of minors; orbit structure; singular locus; general linear group Bruns, W.; Conca, A.: The variety of exterior powers of linear maps, J. algebra 322, 2927-2949 (2009) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure equivariant Chow group; intersection product; linear algebraic group action; equivariant intersection theory Angelo Vistoli, \textit{The Chow ring of {M}2, appendix to equivariant intersection theory} {Inventiones Mathematicae}, \textbf{131}, 1996. DOI 10.1007/s002220050214; zbl 0940.14003; MR1614559 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure arithmetic theory of algebraic groups; algebraic groups over number fields; arithmetic groups; reduction theory; adele groups; Galois cohomologies; Hasse principle; class numbers; normal structure; groups of rational points; automorphic functions Platonov, V. P. \& Rapinchuk, A. S., Algebraic Groups and Number Theory. Nauka, Moscow, 1991 (Russian). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure one-parameter families of elliptic K3 surfaces; parabolic cohomology; Hodge structure; Torelli mapping | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semi-stable representations; Witt vectors; crystalline cohomology; characteristic \(p\); crystalline representations of the absolute Galois group; Hodge-Tate weights Breuil, Christophe, Construction de représentations \textit{p}-adiques semi-stables, Ann. Sci. Éc. Norm. Supér., 31, 281-327, (1998) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure product of sums of squares; Hopf condition; projective quadric; motivic cohomology; Chow group Dugger, D., Isaksen D.: The Hopf condition for bilinear forms over arbitrary fields. Ann. Math (2) 165, 943-964 (2007) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure theorem of Deuring and Shafarevich; algebraic function field; modular representation; rank of class group; ramification index R. Gold andM. Madan, An application of a Theorem of Deuring and Safarevic. Math. Z.191, 247-251 (1986). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; rational equivalence; motives; balanced correspondence; generic cycle; minimal field of definition; transcendence degree; Bloch's conjecture; rational curve S. Gorchinskiy, V. Guletskii\?, ``Transcendence degree of zero-cycles and the structure of Chow motives'', Cent. Eur. J. Math., 10:2 (2012), 559 -- 568 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge locus; Hodge structures; Chow groups; cycles; rational equivalence; cycle class map; Noether-Lefschetz locus C. Voisin, Variations of Hodge structure and algebraic cycles, in: Proceedings of the ICM Zürich 1994 , Basel: Birkhäuser (1995), vol. I, 706-715. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure additive invariants; group actions; virtual Hodge numbers; Chow variety Hu, Wenchuan, On additive invariants of actions of additive and multiplicative groups, J. K-theory, 12, 3, 551-568, (2013) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure infinitesimal variation of Hodge structure; IVHS; generic Torelli; theorems; minimal elliptic surfaces; variational Torelli Cox, D., Donagi, R.: On the failure of variational Torelli for regular elliptic surfaces with a section. Math. Ann.273, 673-683 (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure finiteness of Chow groups; Witt group R. Parimala, ``Witt groups vis-à-vis Chow groups'' dans Proceedings of the Indo-French Conference on Geometry, (Bombay, 1989) , Hindustan Book Agency, Delhi, 1993, 149-154. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structures; period map; o-minimal structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; higher Chow groups; mixed Tate motives; admissible cycle; polylogarithms; minimal models Bloch, S.: Algebraic cycles and the Lie algebra of mixed Tate motives,J. Amer. Math. Soc. 4 (1991), 771--791. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure simple algebraic group; nilpotent orbit; characteristic cycles; cuspidal character sheaves DOI: 10.1016/S0019-3577(01)80014-8 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structures; Hodge classes; Hodge conjecture; non-Abelian Hodge theory; Gauss-Manin connection; algebraic stacks | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure moduli of sheaves; algebraic surfaces; intersection cohomology; Hodge-Poincaré polynomial | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group actions; homogeneous spaces; classification of doubly transitive algebraic transformation; groups; classification of doubly transitive algebraic transformation groups [10] F. Knop, &Mehrfach transitive Operationen algebraischer Gruppen
rch. Math. (Basel)41 (1983), p.~438Article | &MR~7 | &Zbl~0557. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure classification of analytic surfaces; Hodge structure; orientation | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure multilinear symmetric polynomials; characteristic \(p\); symmetric product; Chow variety; zero cycles; Hilbert scheme Neeman, A.: Zero cycles in pn. Adv. in math. 89, 217-227 (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure transcendence degree; abelian varieties over global fields; Grothendieck conjecture; parameter space; periodic abelian varieties; Mumford-Tate group; Hodge type; period of abelian variety | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure maximal variation of Hodge structure; Hodge level Carlson J., Donagi R.: Hypersurface variations are maximal. I. Invent. Math. 89(2), 371--374 (1987) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structure; hyperplane section; simple singularities Damien Mégy, Sections hyperplanes à singularités simples et exemples de variations de structure de Hodge, Ph. D. Thesis, Institut Fourier (Grenoble), available at , 2010 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semifree action; algebraic realization; compact Lie group; orthogonal representation; real algebraic \(G\) variety; smooth \(G\) manifold; algebraically realized; equivariant diffeomorphism; \(G\)-vector bundles; product of a group of odd order and a 2-torus; equivariant map; equivariantly homotopic; equivariant bordism class Dovermann, K.H., Wasserman, A.G.: \textit{Algebraic Realization for Cyclic Group Actions with One Isotropy Type}, preprint (2005) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure even terms of a multiple of the Chern character; Hodge bundles of semi-abelian schemes; torsion classes in Chow theory; explicit bounds for almost all prime powers appearing in their order; numerators of modified Bernoulli numbers | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois representation of the fundamental group of an algebraic curve Oda, T., \textit{A note on ramification of the Galois representation on the fundamental group of an algebraic curve. II}, J. Number Theory, 53, 342-355, (1995) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure motivic Galois group; field of charateristic zero; triangulated motives; Hopf algebra; \(\Lambda\)-vector space J. Ayoub, ''Erratum à L'algèbre de Hopf et le groupe de Galois motiviques d'un corps de caractéristique nulle, II,'' J. Reine angew. Math., vol. 693, p. e1-e2, 2014. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow transformation; periods; algebraic cycles Méo, M., Réduction de la conjecture de Hodge à une continuité, C. R. Acad. Sci. Paris, Ser. I, 348, 625-628, (2010) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Nash conjecture; linearizability problem of reductive algebraic group actions; cancellation problem | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure dimension of homology group; PEL-type; Hodge conjecture Abdulali, S, Abelian varieties and the general Hodge conjecture, Comp. Math., 109, 341-355, (1997) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure \(K3\) surfaces; Chow ring; Beauville-Voisin's zero-cycle; deformation of morphisms; singularities. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Kloosterman equations; affine algebraic groups; motifs; Hodge theory; differential Galois group; ordinary differential field; Tannakian categories N. M. Katz, ''On the calculation of some differential Galois groups,'' Invent. Math., vol. 87, iss. 1, pp. 13-61, 1987. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure connected reductive linear algebraic group; variety of Borel subgroups; Lie algebra; Weil conjecture; Frobenius endomorphism; \(\ell \)-adic cohomology group; eigenvalues Springer, T.A.: A purity result for fixed point varieties in flag manifolds. J.~Fac.~Sci.~Univ.~Tokyo Sect.~IA, Math.~\textbf{31}, 271-282 (1984) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow motives; algebraic groups of type \(F_4\) S. Nikolenko, N. Semenov, and K. Zainoulline, Motivic decomposition of anisotropic varieties of type \(\mathrm{F} _{4}\) into generalized Rost motives , J. K-Theory 3 (2009), 85-102. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure higher algebraic \(K\)-theory; Milnor \(K\)-theory; finite fields; Tate's conjecture; Beilinson's conjecture; Parshin's conjecture; Chow groups; category of pure motives; étale cohomology; motivic cohomology Thomas Geisser, ``Tate's conjecture, algebraic cycles and rational \(K\)-theory in characteristic \(p\).'', \(K\)-Theory13 (1998) no. 2, p. 109-122 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chevalley group schemes; algebraic groups; finite groups of Lie type; classifying stacks; \(\ell\)-adic cohomology | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hopf algebra; coordinate ring; affine algebraic group; hyperalgebra; augmentation ideal; links; cliques; algebra of distributions; locally finite injective hull; pointed clique; filter of ideals; graded algebra DOI: 10.1080/00927879408825095 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Jacobian; Hilbert scheme of points; period map; Torelli problem; Springer resolution; Langlands duality; perverse sheaves; Griffiths period domain; affine Lie algebras; variation of Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure vector bundles; action of reductive group; linearizable algebraic action; trivial bundle over a representation | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure generalized Weil's reciprocity law; one-dimensional group variety; topology of the fiber-structure; invariant of homomorphism; Riemann surface | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Harish-Chandra module; Hodge filtration; Hilbert scheme of n points; group action; Weil group; Hodge D-modules; isotypic component V. Ginzburg, Isospectral commuting variety and the Harish-Chandra \( D\)-module, Electronic preprint arXiv:1002.3311. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow groups; tensor triangulated geometry; maximal orders; derived categories of sheaves; noncommutative algebraic geometry | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure set theoretic intersections; embedding; Chow zero cycles Bloch, S.; Murthy, M. P.; Szpiro, L., Zero cycles and the number of generators of an ideal, Mém. Soc. Math. Fr., 38, 51-74, (1989) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure dilogarithm; polylogarithm; regulator; Chern class; variation of mixed Hodge structure; motive R. Hain, \textit{Classical polylogarithms}, in U. Jannsen, S. Kleiman and J.-P. Serre eds., \textit{Motives}, \textit{Proc. Symp. Pure Math.}\textbf{55} (1994) 3 [alg-geom/9202022]. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero estimates; commutative group variety; multiplicity; multiprojective varieties; Baker's theory; linear forms in logarithms; algebraic groups; derivations along one-parameter subgroup; multihomogeneous polynomials [15]D. Masser and G. W\"{}ustholz, Zero estimate on group varieties II, Invent. Math. 80 (1985), 233--267. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure complex local systems; fundamental group; mixed Hodge structure Lasell, B. : Complex local systems and morphisms of varieties. Dissertation , University of Chicago (1994). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group of rational points; Mazur's conjecture; commutative algebraic group; density property; linear groups; abelian varieties; extensions of an elliptic curve Waldschmidt, M.: Densité des points rationnels sur un groupe algébrique. Experiment. Math., 3, pp. 329--352 (1994) (Erratum: vol. 4 (3) 1995), 255) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure symmetric product; algebraic cycle; Chow group Polishchuk, Selecta Math. 13 pp 531-- (2007) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure local fields; p-adic number fields; diophantine equations; Bernoulli numbers; recurrent series; power series of algebraic; functions; Weierstrass preparation theorem; Newton polygon; Kronecker-Weber theorem; Jacobi sums; Hasse principle; Selmer; group; p-adic L-functions; rationality of power series J. W. S. Cassels, \textit{Local fields}, London Mathematical Society Student Texts, Vol. 3, Cambridge University Press, Cambridge, 1986. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed Hodge structure on the cohomology of the Milnor fibre of an isolated hypersurface singularity; holonomic D-modules; Hodge filtration J. Scherk andJ. H. M. Steenbrink, On the mixed Hodge structure on the cohomology of the Milnor fibre. Math. Ann.271, 641--665 (1985). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero of a polynomial; Nielsen number; algebraic set | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic group; Lie group; Deodhar Stratification; generalized minor; chamber minor; double Schubert cell; double Bruhat cell; total positivity; cluster algebra; flag variety; Poisson structure; Bruhat decomposition Ben Webster and Milen Yakimov, A Deodhar-type stratification on the double flag variety, Transform. Groups 12 (2007), no. 4, 769-785. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow groups; motives; Hyperkähler varieties; non-symplectic automorphisms; \(K3\) surfaces; Calabi-Yau varieties; Bloch-Beilinson conjectures; weak splitting property; multiplicative Chow-Künneth decomposition 15. R. Laterveer, About Chow groups of certain hyperkähler varieties with non-symplectic automorphisms, to appear in Vietnam Journal of Mathematics. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge theory; algebraic groups; transcendence; Schanuel conjecture; Grothendieck conjecture; Baker theorem; connected algebraic group Wüstholz, G.: Algebraic groups, Hodge theory, and transcendence. Proceedings of the international congress of mathematicians, vols. 1, 2, 476-483 (1987) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure transcendental algebraic geometry; Hodge theory; period mappings; period domains; Mumford-Tate varieties; Shimura varieties; Higgs bundles; Torelli theorems; Gauss-Manin connection; algebraic cycles Carlson, J., Müller-Stach, S., Peters, C.: Period Mappings and Period Domains. Cambridge Studies in Advanced Mathematics, 2nd edn. Cambridge University Press, Cambridge (2017) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic geometry; positive characteristic; Hodge cohomology; de Rham cohomology; Grothendieck ring of varieties; birational invariants | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure structure of group rational points; isogeny; elliptic curve over finite field J. F. Voloch, ''A note on elliptic curves over finite fields,'' Bull. Soc. Math. France 116(4), 455--458 (1988). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Landau-Ginzburg model; dg-categories of singularities; matrix factorisations; vanishing cycles; nearby cycles; motives; noncommutative motives; motivic homotopy theory Morel-Voevodsky; motivic realisations; \(\ell\)-adic sheaves; algebraic K-theory | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure not numerically effective canonical bundles; deformation; numerical effectiveness; minimal model; ruled surfaces; classification of algebraic threefolds; canonical divisors; extremal rays; equivalence classes of 1- cycles; cone theorem; extremal rational curves on surfaces S. Mori, ''Threefolds whose canonical bundles are not numerically effective,'' Ann. Of Math. (2) 116(1), 133--176 (1982). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Picard group; quadratic intersection form on the Néron-Severi-group of a compact complex non-algebraic surface; algebraic dimension; 2-vector bundles Brînzânescu, V., Flondor, P.: Quadratic intersection form and -vector bundles on nonalgebraic surfaces, Proc. Conf. on Alg. Geometry, Berlin 1985, Teubner: Band 92, 1986 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Picard group; weight structure; mixed motives; motivic spectra; noncommutative mixed motives; symmetric ring spectra; noncommutative algebraic geometry Bondarko, Mikhail; Tabuada, Gonçalo, Picard groups, weight structures, and (noncommutative) mixed motives, Doc. Math., 22, 45-66, (2017) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linear action of reductive algebraic group; stable points; 1-parameter subgroups; \(X^{sss}\); resolution of singularities Zinovy Reichstein, Stability and equivariant maps, Invent. Math. 96 (1989), no. 2, 349-383. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Nash conjecture; linearizability problem of reductive algebraic group actions; cancellation problem | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semi-positivity; zero Kodaira dimension; Additivity of Kodaira dimension; algebraic fibre space; period map Yujiro Kawamata, Hodge theory and Kodaira dimension, Algebraic varieties and analytic varieties (Tokyo, 1981) Adv. Stud. Pure Math., vol. 1, North-Holland, Amsterdam, 1983, pp. 317 -- 327. | 0 |
Subsets and Splits
No community queries yet
The top public SQL queries from the community will appear here once available.