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hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) surface singularity; \(Q\)-Gorenstein singularities; smoothing | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) very ampleness of line bundles; Kähler manifolds; sectional curvature; Kodaira embedding theorem S.-K. Yeung, Very ampleness of line bundles and canonical embedding of coverings of manifolds, Compos. Math. 123 (2000), no. 2, 209-223. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Nevanlinna theory; Picard-Berkovich's Theorem Boutabaa, A.; Escassut, A.: Parametrization of curves in characteristic p, Commentarii mathematici universitatis sancti Pauli 53, No. 2, 205-217 (2004) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Projective bundles; moduli of stable bundles; Skolem-Noether theorem; derived categories; rigidification | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Dirichlet density theorem; homology group; primitive conjugacy classes; generalized homology group; Ihara zeta-functions; connected graphs | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Picard group; Noether-Lefschetz theorem; complete intersections; Noether- Lefschetz locus Kim, S.-O., \textit{Noether-Lefschetz locus for surfaces}, Trans. Amer. Math. Soc., 324, 369-384, (1991) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) solving polynomial systems; sparse polynomial systems; toric varieties; Cox rings; eigenvalue theorem; symbolic-numeric algorithm | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) sofic group; group ring; Kaplansky's conjectures; direct finiteness; symbolic variety; algebraic cellular automaton; surjunctivity; invertibility; garden of Eden theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) surface singularity; rational homology sphere; Milnor fibre | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) topology of a complex algebraic variety; stable diffeomorphity; Lefschetz theorem N. Yu. Netsvetaev, ''Diffeomorphism criteria for smooth manifolds and algebraic varieties,''Contemporary Math.,431 (3), 453--459 (1992). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) noncommutative algebraic curve; divisor class group; degree map; Riemann-Roch theorem; Weil conjectures | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) class field theory; Bost-Connes system; anabelian geometry; Neukirch-Uchida theorem; \(L\)-series | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Hodge structures; variation of Hodge structure; hypersurfaces; Torelli theorem | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Galois representations; Fermat's last theorem; Hecke algebras; complete intersections; Euler characteristics Taylor, R.; Wiles, A., \textit{ring-theoretic properties of certain Hecke algebras}, Ann. of Math. (2), 141, 553-572, (1995) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) K3 surfaces; period map; Torelli theorem; complex 2-torus; Kähler surface DOI: 10.1023/A:1022557004624 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Rationality of Moduli Scheme; Holomorphic Vector Bundle; Singularity Hulek, K., Stable rank-2 vector bundles on \(\mathbf{P}_2\) with \(c_1\) odd, Math. Ann., 242, 3, 241-266, (1979) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) algebraic curve; complete intersection; Bacharach duality theorem Cárdenas, H., San Agustín, R.: On Veronese's decomposition theorems and the geometry of outer automorphisms of groups \(S_6\). J. Comb. Math. Comb. Comput. \textbf{22}, 225-239 (1996) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) multivariate cryptography; algebraic cryptanalysis; Section Finding Problem (SFP); Gröbner bases; decomposition of ideals Faugère, Jean-Charles; Spaenlehauer, Pierre-Jean, Algebraic cryptanalysis of the PKC'2009 algebraic surface cryptosystem, 35-52, (2010), Berlin, Heidelberg | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Bibliography; adjunction theory; threefolds; ampleness; Hilbert schemes; Mori's theory; Kawamata's rationality theorem; adjoint bundles; double point formula for threefolds; Chern inequalities M. C. Beltrametti, A. J. Sommese, \textit{The adjunction theory of complex projective varieties}, volume 16 of \textit{de Gruyter Expositions in Mathematics}. De Gruyter 1995. MR1318687 Zbl 0845.14003 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) toric variety; cusp singularity; lattice polytope; reflection group | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) killing cycles; lifting of vector bundles; syzygy theory; depth; maximal Cohen-Macaulay modules; syzygy theorem; factoriality of regular local rings; small multiplicities; local cohomology Evans, E. G.; Griffith, P.: Syzygies, London math. Soc. lecture note ser. 106 (1985) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Chevalley-Weil theorem; covers; ramification; Diophantine equations | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) \(cDV\) singularity; Gorenstein threefold singularity; small resolution; versal deformation spaces Katz, S.: Small resolutions of Gorenstein threefold singularities. Algebraic geometry: Sundance 1988, pp. 61-70, Contemp. Math., vol. 116, Am. Math. Soc., Providence, RI (1991) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) pointwise planar normal section; symmetric space; Euler-Poincaré characteristic | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) graded Cohen-Macaulay singularity; syzygy; Kähler differentials; hypersurface singularities Martsinkovsky, A, Maximal Cohen-Macaulay modules and the quasihomogeneity of isolated Cohen-Macaulay singularities, Proc. Am. Math. Soc., 112, 9-18, (1991) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Nullstellensatz; model-theoretic theorem of zeros; T-radical | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Riemann-Roch theorem; \(\lambda\)-differential; annulus domain; Cauchy integral formula | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) simple complete intersection singularity; Milnor number | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) classification of 3-folds of general type; numerically effective canonical divisor; crepant resolution; canonical models; partial resolution; exceptional prime divisor; terminal singularity; quick singularities M. Reid, \textit{Minimal models of canonical} 3\textit{-folds}, in \textit{Algebraic varieties and analytic varieties (Tokyo, 1981)}, \textit{Adv. Stud. Pure Math.}\textbf{1} (1983) 131, North-Holland, Amsterdam, The Netherlands. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Hilbert scheme compactification of the space of twisted cubic; curves; Piene-Schlessinger comparison theorem; infinitesimal deformation; Hilbert scheme compactification of the space of twisted cubic curves R. Piene and M. Schlessinger, On the Hilbert scheme compactification of the space of twisted cubics, Amer. J. Math. 107 (1985), no. 4, 761-774. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) divisors on algebraic surfaces; number of moduli; Clifford type theorem; Clifford index | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) 3-fold; double cover of projective 3-space; intermediate Jacobian; theta divisor; Abel-Jacobi map; constructive Torelli theorem Voisin, Claire, Sur la jacobienne intermédiaire du double solide d'indice deux, Duke Math. J., 57, 2, 629-646, (1988) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) threshold; singularity; variety; \(5/6\) Yu. Prokhorov, ''Gap conjecture for 3-dimensional canonical thresholds,'' J. Math. Sci. Univ. Tokyo 15(4), 449--459 (2008). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Darboux-Jouanolou theorem; rational maps; foliations | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Quillen-Suslin theorem; Suslin's stability theorem; constructive mathematics; computer algebra Lombardi, H., Yengui, I.: Suslin's algorithms for reduction of unimodular rows. J. Symb. Comput. 39, 707--717 (2005) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) smooth scheme; hypersurface section; finite fields; density; Poonen's point sieve | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Milnor fibration; monodromy theorem; Kähler manifolds; quasi-projective varieties; de Rham complex; fundamental group; homology jump loci; torsion; mixed Hodge structure Budur, N.; Liu, Y.; Wang, B., The monodromy theorem for compact Kähler manifolds and smooth quasi-projective varieties, Math. Ann., 371, 3-4, 1069-1086, (2018) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) abelian varieties; finite fields; genus 3; class field theory; curves; rational points; genus 2; Deligne-Lusztig curves; ; Smyth's method; Voloch bound; Ihara constant; Ihara's tower theorem; Golod-Shafarevich theorem; Oesterle's theorem; asymptotic result; explicit formulas Weil's bound | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) pure sheaf of weight w; hard Lefschetz theorem; intersection homology; perverse sheaves; middle perversity; Verdier duality; finite characteristic Beilinson, A. A.; Bernstein, J.; Deligne, P., Faisceaux pervers, Astérisque, 100, (1982) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) weak Lefschetz theorem; de Rham complex; stupid filtration; filtered de Rham complex; vanishing theorem of Kodaira-Akizuki-Nakano; vanishing theorem of Grauert-Riemenschneider | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Liouville-Arnold integration method; sine-Gordon equation; Hamiltonian framework; Adler-Kostant-Symes theorem; loop algebra [HW] Harnad, J., Wisse, M.-A., Isospectral Flow in Loop Algebras and Quasiperiodic Solutions to the Sine-Gordon Equation. J. Math. Phys.34, 3518--3526 (1993) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) \(q\)-complete map; direct images of complexes; vanishing of lower cohomology; Zariski-Lefschetz type theorems; base change theorem H. A. Hamm and Lê Dũng Tráng, ''Vanishing Theorems for Constructible Sheaves. II,'' Kodai Math. J. 21, 208--247 (1998). | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Clifford's theorem; curves with odd gonality Martens, G.: On curves of odd gonality. Arch. math. 67, 80-88 (1996) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) affine algebras; actions of finite dimensional cocommutative Hopf algebras; Noether's theorem; finite groups of automorphisms; triangular Hopf algebras; quantum-commutative modules; non-commutative determinant functions; symmetric braidings; twist maps; categories of modules; Grassmann algebras; group gradings Cohen, M.; Westreich, S.; Zhu, S., Determinants, integrality and Noether's theorem for quantum commutative algebras, Israel J. math., 96, 185-222, (1996) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Lubin-Tate group; local analog of Kronecker-Weber theorem; maximal unramified extension; local class field theory; maximal abelian extension Gold ( R. ) .- Local class field theory via Lubin-Tate groups , Indiana Univ. Math. J. 30, p. 795 - 798 ( 1981 ). MR 625603 | Zbl 0596.12014 | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Newton-Okounkov convex body; big divisor; finitely generated section ring D. Anderson, A. Küronya and V. Lozovanu, Okounkov bodies of finitely generated divisors, Int. Math. Res. Not. IMRN 2014 (2014), no.9, 2343--2355. | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Hurwitz' theorem; Riemann surfaces; automorphisms; arithmetic Fuchsian groups; triangle groups; quaternion algebras Belolipetsky M., Math. Proc. Cambridge Philos. Soc. 138 pp 289-- (2005) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) reconstruction theorem Calabrese, J; Groechenig, M, Moduli problems in abelian categories and the reconstruction theorem, Algebra. Geom., 2, 1-18, (2015) | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) conical singularity; inclusions; intersection homology | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) Kodaira vanishing theorem; dualizing sheaf; Cohen-Macaulay projective variety | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) minimal model; dlt singularity; vanishing theorems | 0 |
hyperplane section theorem; isolated singularity Mori, Shigefumi, On a hyperplane section theorem of Gurjar, Math. Ann., 0025-5831, 319, 3, 533-537, (2001) irreducible perverse sheaf; Milnor monodromy; Milnor number; isolated hypersurface singularity P. Nang and K. Takeuchi, Characteristic cycles of perverse sheaves and Milnor fibers, Math. Z. 249 (2005), 493-511. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow group; zero-cycles on a projective algebraic surface; mixed Hodge structure; weight; level of a Hodge structure; level for Chow groups; hard Lefschetz conjecture; general Hodge conjecture Lewis, J, A generalization of mumford's theorem II, Ill. J. Math., 39, 288-304, (1995) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; variation of Hodge structure; Noether-Lefschetz locus; Lefschetz degenerations; Chow group; Griffiths group; non-rigid Calabi- Yau threefolds C. Voisin, Transcendental methods in the study of algebraic cycles, in: Algebraic cycles and Hodge theory, Lecture Notes in Math. 1594, Springer-Verlag (1994). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bloch Beilinson conjecture; Hodge theory; variations of Hodge structure; variations of complex structure; period mappings; cohomology classes of an analytic cycle; algebraic cycles; mixed Hodge structures; infinitesimal variations of the Hodge structure; Abel-Jacobi map; Chow groups Voisin, C., Théorie de Hodge et géométrie algébrique complexe, (2002), Société mathématique de France Paris, Cours spécialisés | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chern classes; Chow groups; mixed Hodge structure; spaces of algebraic cycles on an algebraic variety; historical perspective H. Blaine Lawson Jr., Spaces of algebraic cycles, Surveys in differential geometry, Vol. II (Cambridge, MA, 1993) Int. Press, Cambridge, MA, 1995, pp. 137 -- 213. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Griffiths group; Fano manifolds of Calabi-Yau type; Hodge theory; variation of Hodge structure; Calabi-Yau geometries; Derived categories D. Favero, A. Iliev, L. Katzarkov, On the Griffiths groups of Fano manifolds of Calabi-Yau Hodge type, arXiv:1212.2608. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow groups; Leray spectral sequence; Abel-Jacobi map; Bloch-Beilinson conjecture; algebraic cycles; Hodge theory; Lefschetz theorems; variations of Hodge structure; generic Torelli theorem C. Voisin, \textit{Hodge Theory and Complex Algebraic Geometry. I, Cambridge Studies in Advanced Mathematics}, Vol. 77, Cambridge University Press, Cambridge, 2003. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge group; Chow group of zero-cycles; Albanese map; Picard variety | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hogde conjecture; algebraic cycles; variation of Hodge structure; mixed Hodge structure; Hodge filtration; Tate conjecture; Weil conjecture; Mumford-Tate group; Torelli problem | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow group; motive; finite-dimensional motive; Bloch's conjecture; generalized Hodge conjecture; Bloch-Beilinson filtration; Beauville's ``splitting property'' conjecture; hyperkähler varieties; Fano varieties of lines on cubic fourfolds; Lehn-Lehn-Sorger-van Straten eightfolds; non-symplectic automorphism | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow group; motivic Galois group; motives; algebraic cycles; Grothendieck's standard conjectures; Hodge conjecture; Abel-Jacobi map; category of mixed Hodge structures; tannakian categories; category of abelian varieties; 1-motives; weight filtration; derived categories; perverse sheaves; fundamental group; category of motives; Tate motives Pierre Deligne, À quoi servent les motifs?, Motives (Seattle, WA, 1991) Proc. Sympos. Pure Math., vol. 55, Amer. Math. Soc., Providence, RI, 1994, pp. 143 -- 161 (French). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge group; Chow group of zero-cycles; Albanese map; Picard variety | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Brauer-Manin obstruction; Chow group of zero-cycles; fibration method; rational points Harpaz, Y.; Wittenberg, O., On the fibration method for zero-cycles and rational points, Annals of Mathematics, 183, 229-295, (2016) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure normal function; Hermitian symmetric domain; Mumford-Tate group; variation of Hodge structure; algebraic cycle | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bloch-Beilinson filtration; Chow group of zero-cycles; abelian varieties; (co)niveau filtration | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure generalized Kummer varieties; Chow group of zero-cycles; Bloch-Beilinson filtration; Beauville conjecture; constant cycle subvarieties | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group of algebraic cycles of codimension k; intermediate Jacobians; normal function; horizontal normal functions; Hodge conjecture S. Zucker, Intermediate Jacobians and normal functions , Topics in Transcendental Algebraic Geometry (Princeton, N.J., 1981/1982), Ann. of Math. Stud., vol. 106, Princeton University Press, Princeton, NJ, 1984, pp. 259-267. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Néron model; slit analytic space; Abel-Jacobi map; admissible normal function; variation of Hodge structure; limit mixed Hodge structure; motivic cohomology; unipotent monodromy; semistable reduction; algebraic cycle; higher Chow cycle; Ceresa cycle; Clemens-Schmid sequence; polarization; slit analytic space Green, Mark; Griffiths, Phillip; Kerr, Matt, Néron models and limits of Abel-Jacobi mappings, Compos. Math., 0010-437X, 146, 2, 288-366, (2010) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure degeneration of Hodge structures; algebraic cycles; weight filtration; complex of nearby cycles; local invariant cycle theorem; Chow motives S. Bloch, H. Gillet, and C. Soulé, Algebraic cycles on degenerate fibers, Arithmetic geometry (Cortona, 1994) Sympos. Math., XXXVII, Cambridge Univ. Press, Cambridge, 1997, pp. 45 -- 69. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebra of motivated cycles; standard conjectures; tannakian category; motivic Galois group; Hodge conjecture; Tate conjecture; algebraicity of the Lefschetz involution; base pieces; motivated \(E\)-correspondences; algebraic gerb; motivic cohomology; Hodge conjecture for abelian varieties; motif with integer coefficients; motives in characteristic \(p\); numerical equivalence coincides with homological equivalence André, Y., Pour une théorie inconditionnelle des motifs, Inst. Hautes études Sci. Publ. Math. No., 83, 5-49, (1996) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structure; transcendental algebraic geometry; algebraic cycles; polarized Hodge structure; period maps of families of polarized algebraic manifolds | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Picard group; Chow group; zero cycles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Milnor K-theory; Chow group of zero cycles Kato, K, Milnor \(K\)-theory and the Chow group of zero cycles, Contemp. Math. I, I, 241-253, (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure polarized Hodge structures of weight 2; vanishing of cycles in the intermediate jacobian; filtration on the Chow group Saito, H.: Generalization of Abel's theorem and some finiteness properties of 0-cycles on surfaces. Compositio math. 84, 289-332 (1992) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure torsion free relative Chow group; group of zero-cycles modulo rational equivalence; \(K_ 0\) M. Levine, Zero-cycles and \(K\)-theory on singular varieties , Algebraic geometry, Bowdoin, 1985 (Brunswick, Maine, 1985), Proc. Sympos. Pure Math., vol. 46, Amer. Math. Soc., Providence, RI, 1987, pp. 451-462. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; higher Chow groups; higher regulators; variation of Hodge structures; \(K3\) surfaces | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bibliography; L-functions; regulators; algebraic cycles; Deligne-Beilinson cohomology; Yoneda extensions; mixed motives; Pell's equation; Dedekind's class number; Taylor series; Hodge conjecture; Tate's conjecture; polylogarithms; variations of mixed Hodge structures; generalized Hodge group; Birch and Swinnerton-Dyer conjectures; arithmetic varieties D. Ramakrishnan, Regulators, algebraic cycles, and values of \(L\)-functions , Algebraic \(K\)-theory and algebraic number theory (Honolulu, HI, 1987), Contemp. Math., vol. 83, Amer. Math. Soc., Providence, RI, 1989, pp. 183-310. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure simple abelian varieties of prime dimension; Hodge conjecture on algebraic cycles; zeta-function of the abelian variety; Tate conjecture; Mumford-Tate group; Mumford-Tate conjecture DOI: 10.1070/IM1983v020n01ABEH001345 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure moduli space of vector bundles; relative Chow group; Abel-Jacobi map; Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Mumford's theorem; Lefschetz conjectures; Chow group; algebraic cycles; Hodge filtration Lewis, J, Towards a generalization of mumford's theorem, J. Math. Kyoto Univ., 29, 195-204, (1989) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic surfaces; Kähler manifolds; moduli; deformations; topological methods; fibrations; Kodaira fibrations; Chern slope; automorphisms; uniformization; projective classifying spaces; monodromy; fundamental groups; variation of Hodge structure; absolute Galois group; locally symmetric varieties | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure corank; finiteness; \(p\)-primary torsion part; Chow group of zero-cycles; Fermat quartic surface; Selmer groups; conjectures of Beilinson and Bloch-Kato | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure torsion algebraic cycles; Chow group; cycle map; rational classes of codimension 2 Saito, S.: On the cycle map for torsion algebraic cycles of codimension two. Invent. Math. 106(3), 443--460 (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure higher Chow group; algebraic surface; mixed Hodge structure; deformation | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero-cycles; infinite-dimensionality of the Chow group; singular surfaces V. Srinivas, Zero cycles on a singular surface. I, J. Reine Angew. Math. 359 (1985), 90 -- 105. With an appendix by S. Bloch. V. Srinivas, Zero cycles on a singular surface. II, J. Reine Angew. Math. 362 (1985), 4 -- 27. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge cycles; CM-motives; Tate conjecture for algebraic cycles; Hilbert modular surfaces; Hilbert modular forms of CM-type; Picard group V. K. Murty, D. Ramakrishnan, Period relations and the Tate conjecture for Hilbert modular surfaces, Invent. Math. 89 (1987), no. 2, 319--345. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero cycles; rational equivalence; variation of Hodge structure; cohomology of hypersurfaces; Jacobian ring Voisin, C, Variations de structure de Hodge et zéro-cycles sur LES surfaces générales, Math. Ann., 299, 77-103, (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow group; motive; Bloch-Beilinson filtration; surface of general type; \(K3\) surface; Beauville's ``splitting property'' conjecture; multiplicative Chow-Künneth decomposition | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure methods of algebraic \(K\)-theory; Hodge theory; algebraic curves; Bloch-Beilinson conjectures; algebraic cycles; Chow groups; monodromy Green, M., Griffiths, P.: The regulator map for a general curve. In: Symposium in Honor of C. H. Clemens (Salt Lake City, UT, 2000), pp. 117-127, Contemporary Mathematics, vol. 312. American Mathematical Society, Providence (2002) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure deformation theory; representations of finitely generated groups; algebraic group; variety; real points; lattice; semisimple Lie group; fundamental group; compact Kähler manifold; monodromy representation; polarized Hodge structure; Margulis superrigidity theorem; hyperbolic manifolds; totally geodesic hypersurfaces; flat connections J.J. Millson. Deformations of Representations of finitely Generated Groups. Contemp. Math.74, 237-253 (1988) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure codimension 2 cycles modulo rational equivalence; Chow group of algebraic varieties with isolated singularities DOI: 10.1016/0022-4049(84)90033-1 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero-cycles; K-theory; Chow group; rational surface with conic bundle structure P. Salberger, ''Zero-cycles on rational surfaces over number fields,'' Invent. math., vol. 91, iss. 3, pp. 505-524, 1988. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; first order invariants of a normal function; variation of Hodge structure of odd weight | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure projective varieties; number of rational points; Chow group; algebraic cycles; rational equivalence Hélène Esnault, Marc Levine, and Eckart Viehweg, Chow groups of projective varieties of very small degree, Duke Math. J. 87 (1997), no. 1, 29 -- 58. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure non-representability of Chow groups; weakly representable Chow group; Hodge structure; Hodge substructure Schoen C.: On Hodge structures and non-representability of Chow groups. Compositio Mathematica 88, 285--316 (1993) | 1 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow group; rational equivalence of zero cycles Michel Gros, 0-cycles de degré 0 sur les surfaces fibrées en coniques, J. Reine Angew. Math. 373 (1987), 166 -- 184 (French). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure stable rationality; quartic threefolds; specialization; Chow group of zero-cycles; correspondances; groupe de Brauer Colliot-Thélène, J.-L.; Pirutka, A., Hypersurfaces quartiques de dimension 3: non-rationalité stable, Ann. Sci. Éc. Norm. Supér. (4), 49, 2, 371-397, (2016) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Picard group; zero-cycles in the Chow ring; Pic; del Pezzo surface; quadratic extension of local fields K. R. Coombes and D. J. Muder, Zero cycles on del Pezzo surfaces over local fields , J. Algebra 97 (1985), no. 2, 438-460. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Bloch-Beilinson filtration; Chow group; \(K3\) surface; motive; surface of general type | 0 |
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