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zero cycles; Chow group of algebraic cycles; Hodge structure algebraic curve; algebraic points of small degree; Mordell-Weil group; linear systems | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow forms; zero cycles; Grassmannians; toric varieties; flag varieties Elizondo, E. J. (2004).Chow varieties, the Euler-Chow series and the total coordinate ring Trascendental Aspects of Algebraic Cycles, 3--43. London Math. Soc. Lecture Note Ser., 313, Cambridge: Cambridge Univ. Press. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group of k-rational points; affine algebraic group; topological irreducibility; unitary representations; algebraic irreducibility | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure action of reductive algebraic group; coordinate ring; equivariant completion; orbit Andy R. Magid, Equivariant completions of rings with reductive group action, J. Pure Appl. Algebra 49 (1987), no. 1-2, 173-185. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure surface singularities; Hodge spectra of analytic germs; semicontinuity of the spectrum; Levine-Tristram signatures; Seifert forms; variation structures; mixed Hodge structure M. Borodzik and A. Némethi, The Hodge spectrum of analytic germs on isolated surface singularities, J. Math. Pures Appl., 2014, DOI 10.1016/j.matpur.2014.10.007 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure completion of algebraic group; projectively normal embedding; intersection of quadrics F. Knop, H. Lange, Commutative algebraic groups and intersection of quadrics. Math. Ann.267, 555--571 (1984). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure local Torelli problem; Hodge structure; local moduli space; weak global Torelli problem; period map; infinitesimal variation of Hodge structure; ample divisors Green M.L.: The period map for hypersurface sections of high degree of an arbitrary variety. Compositio Math. 55(2), 135--156 (1985) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cobordism; Pfister quadric; oriented cohomology theory; Chow group; Chow motive; Rost motive; Tate motive; Lazard ring; Atiyah-Hirzebruch spectral sequence Vishik, A.; Yagita, N., \textit{algebraic cobordisms of a Pfister quadric}, J. Lond. Math. Soc. (2), 76, 586-604, (2007) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linear algebraic group; compactification of a principal homogeneous space; Brauer group Colliot-Thélène, J-L; Kunyavskiĭ, BÈ, Groupe de Brauer non ramifié des espaces principaux homogènes de groupes linéaires, J. Ramanujan Math. Soc., 13, 37-49, (1998) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure admissible variation of mixed Hodge structure; mixed Hodge modules Morihiko Saito, Hodge structure via filtered \?-modules, Astérisque 130 (1985), 342 -- 351. Differential systems and singularities (Luminy, 1983). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure elliptic functions; algebraic independence; small transcendence degrees; zero estimates on group varieties R. Tubbs, Elliptic curves in two dimensional abelian varieties and the algebraic independence of certain numbers, Mich. Math. J., in press. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Griffiths group; étale cobordism; étale homotopy Quick, Torsion algebraic cycles and étale cobordism, Adv. Math. 227 pp 962-- (2011) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois cohomology; Brauer group; Chow group; \(K\)-theory of a product of Severi-Brauer varieties; product of two conics Peyre, E., Products of Severi-Brauer varieties and Galois cohomology, (\textit{K}-Theory and Algebraic Geometry: Connections with Quadratic Forms and Division Algebras, Santa Barbara, CA, 1992, Proc. Sympos. Pure Math., vol. 58, (1995), Amer. Math. Soc. Providence, RI), 369-401 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure surfaces of general type; torsion; étale covers; small invariants; algebraic fundamental group Murakami, M., A bound for the orders of the torsion groups of surfaces with \textit{K}2 = 2\textit{ {\(\chi\)}}-1, \textit{Math. Z.}, 253, 251-262, (2006) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure moduli space of marked cubic surfaces; cubic threefold; period map; complex hyperbolic structure; fundamental group Daniel Allcock, James A. Carlson, and Domingo Toledo, A complex hyperbolic structure for moduli of cubic surfaces, C. R. Acad. Sci. Paris Sér. I Math. 326 (1998), no. 1, 49 -- 54 (English, with English and French summaries). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Lefschetz degenerations; variations of Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure simply-connected group of type \(A_ n\); submodule structure; dual Weyl modules of highest weight; fundamental weights; hyperalgebra Doty, Stephen R., The submodule structure of certain Weyl modules for groups of type \(A_n\), J. Algebra, 0021-8693, 95, 2, 373-383, (1985) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure birational characterization of real projective space; quadratic forms; Witt group; real components of algebraic varieties; unramified cohomology Sujatha, R, Witt groups of real projective surfaces, Math. Ann., 288, 89-101, (1990) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure hypercentral structure; automorphism group of a polynomial algebra; linearity Yu. V. Sosnovskii, ''The hypercentral structure of the group of unitriangular automorphisms of a polynomial algebra,'' Sib. Mat. Zh., 48, No. 3, 689-693 (2007). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure action of finite group; orbifold Euler number; Kähler manifold; Moishezon manifold; orbifold Hodge polynomial Lothar Göttsche, Orbifold-Hodge numbers of Hilbert schemes, Parameter spaces (Warsaw, 1994) Banach Center Publ., vol. 36, Polish Acad. Sci. Inst. Math., Warsaw, 1996, pp. 83 -- 87. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic curve of genus 3; characteristic 2; automorphism group Tufféry, S.: LES automorphismes des courbes de genre 3 de caractéristique 2, C. R. Acad. sci. Paris sér. I math. 321, No. 2, 205-210 (1995) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Cayley method; determinant; elimination theory; discriminants; resultants; Chow varieties; toric varieties; Newton polytopes; real algebraic geometry; hyperdeterminants; discriminant as the determinant of a Koszul complex I.M.~Gel'fand, M.M.~Kapranov and A.V.~Zelevinsky, \textit{Discriminants, resultants and multidimensional determinants}, Birkhäuser, Boston, 1994. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero-cycles; rank 2 bundles; normal Gorenstein surface; locally complete intersection; surface of general type C. F. Catanese,Footnotes to a Theorem of I. Reider, L.N.M.1417 (1990), 67--74 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semisimple, simply connected algebraic group; group scheme; maximal torus; character group; dominant weights; Coxeter number; G-module; group of rational points; injective hull; projective cover; affine Weyl group; fundamental dominant weights; Cartan invariants; composition factors; finite groups of Lie type Humphreys, J. E.: Generic Cartan invariants for Frobenius kernels and Chevalley groups. J. algebra 122, 345-352 (1989) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure $K$-theory; algebraic cycles; Chow groups; lci algebraic cycles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure abelian variety; flag variety; parabolic subgroup; algebraic group of positive characteristic C. S. de Salas, \textit{Complete homogeneous varieties: structure and classification}, Trans. Amer. Math. Soc. \textbf{355} (2003), no. 9, 3651-3667 (electronic). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure topological version of Weil's theorem; birational group law; group chunk; homogeneous group; quasi-algebraic group chunks; differentially algebraic group chunks; model theory; first-order definable L. P. D. van den Dries, Weil's group chunk theorem: a topological setting, Illinois J. Math. 34 (1990), no. 1, 127 -- 139. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure compact Riemann surface; algebraic curve; simple Lie group; line bundles; Maurer-Cartan structure equations; infinitesimal Plücker formulae Yang K.: Plücker formulae for the orthogonal group. Bull. Austral. Math. Soc. 40, 447--456 (1989) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure differential invariant; orbits of an algebraic group; rational forms P. V. Bibikov and V. V. Lychagin, ''Classification of Linear Actions of Algebraic Groups on Spaces of Homogeneous Forms,'' Dokl. Phys. 85(1), 109--112 (2012). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic K-theory; algebraic cycles; zeta-function of scheme; p-adic cohomology; Tate conjecture on cycles; Beilinson conjecture Soulé, C.: K-théorie et zéros aux points entiers de fonctions zêta. Proc. ICM (1983) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; multiplicative Chow-Künneth decomposition | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure determinant of period integrals; motive of rank 1; tame symbol; determinant object; relative Chow group; motivic Picard group Takeshi Saito and Tomohide Terasoma, A determinant formula for period integrals, Proc. Japan Acad. Ser. A Math. Sci. 69 (1993), no. 5, 131 -- 135. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure computational aspects of algebraic geometry; systems of equations; continual methods; homotopy methods; approximate zero; certified algorithms; complexity Beltrán, C.; Leykin, A., Certified numerical homotopy tracking, Exp. math., 21, 1, 69-83, (2012) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Pierre de Fermat; René Descartes; Leonhard Euler; affine space; barycenter; real affine space; Pasch's theorem; Euclidean space; metric space; Gram-Schmidt process; approximation by the law of least squares; Fourier approximation; Hermitian space; projective space; duality principle; Fano's theorem; projective quadric; Pascal's theorem; Brianchon's theorem; topology of projective real spaces; algebraic plane curves; Bezout's theorem; Hessian curve; Cramer's paradox; group of a cubic; rational algebraic plane curve; Taylor's formula for polynomials in one or more variables; Eisenstein's criterion; Euler's formula; fundamental theorem of algebra; Sylvester's theorem | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structure; infinitesimal Torelli theorem | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure inverse problem of Galois theory; Fischer-Griess monster as Galois group over \({\mathbb{Q}}\); finite simple groups; fundamental group; rigid simple groups; cyclotomic field; discrete subgroups of \(PSL_ 2({\mathbb{R}})\); congruence subgroup; modular curve; Puiseux-series; group of covering transformations; compact Riemann surface; algebraic function field; ramification points; cusps; lectures | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure fundamental group of the complement of a plane algebraic curve; nodal algebraic curves; computer algorithm S. Yu. Orevkov, ''The fundamental group of the complement of a plane algebraic curve,''Mat. Sb. [Math. USSR-Sb.],137 (179), No. 2, 260--270 (1988). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow groups; motives; Bloch's conjecture; Bloch-Beilinson filtration; hyperkähler varieties; multiplicative Chow-Künneth decomposition; splitting property; finite-dimensional motive | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure simply connected affine algebraic group; extensions of irreducible modules; alcove transition Doty, S.R.; Sullivan, J.B.: On the geometry of extensions of irreducible modules for simple algebraic groups. Pacific J. Math. 130, 253-273 (1987) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Siegel Eisenstein series; cohomology group; Siegel modular variety; mixed Hodge structure; abelian varieties T. Miyazaki, Mixed Hodge structures of Siegel modular varieties, J. Math. Sci. Univ. Tokyo 3 (1996), 297--330. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycle; Chow group; singular scheme; formal scheme; Tate algebra; rigid geometry; motivic cohomology; Milnor \(K\)-theory; algebraic de Rham cohomology; de Rham-Witt form | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure \(G\)-scheme; 2-cocycle; semidirect product algebra; twisted group algebra; equivariant algebraic \(K\)-theory; twisted projective homogeneous scheme; full exceptional collection; equivariant motivic measure; noncommutative algebraic geometry; \(G\)-equivariant Chow motive; \(G\)-equivariant perfect complex; noncommutative Chow motives | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure representation of semi-simple algebraic group; irreducible representation; action; orbits T. Kimura, S.-i. Kasai and O. Yasukura, A classification of the representations of reductive algebraic groups which admit only a finite number of orbits, Amer. J. Math. 108 (1986), 643--692. JSTOR: | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of Hodge structure; flat bundle; polarization; twistor \(\mathcal{D}\)-module; Fourier-Laplace transform; supersymmetric index; spectral polynomial Claude Sabbah, Fourier-Laplace transform of a variation of polarized complex Hodge structure, II, New developments in algebraic geometry, integrable systems and mirror symmetry (RIMS, Kyoto, 2008) Adv. Stud. Pure Math., vol. 59, Math. Soc. Japan, Tokyo, 2010, pp. 289 -- 347. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow groups; pure motives; singular varieties | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic zero cycles; real affine algebraic variety; projective module; unimodular element; Chern class; real regular functions S. M. Bhatwadekar and Raja Sridharan, Zero cycles and Euler class groups of smooth real affine varieties, Invent. Math., 136 (1999), 287--322. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic group; classical group; exceptional group; simply connected group; adjoint group; quasisplit group; principal homogeneous space; zero cycle; rational point; Galois cohomology J. Black, Zero cycles of degree one on principal homogeneous spaces, Journal of Algebra, 334 (2011), 232--246.Zbl 1271.11046 MR 2787661 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure action of reductive linear algebraic group on affine scheme; closed orbit; affine Cremona group; fixed points; étale slice theorem; linearizable actions; cancellation problem; linearization problem H. Bass,Algebraic group actions on affine spaces, in Contemporary Mathematics, Vol. 43, Am. Math. Soc., 1985, pp. 1--23. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chamber structures; polarizations on algebraic surfaces; Kodaira dimension zero; moduli spaces of stable rank two bundles; Chern classes Qin, Z.B.: Chamber structures of algebraic surfaces with Kodaira dimension zero and moduli spaces of stable rank two bundles. Math. Z.207, 121--136 (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure elliptic curve; group of 0-cycles; Flach's finiteness theorem; Selmer group; complex multiplication; higher \(p\)-adic Abel-Jacobi map A. Langer and W. Raskind, 0-cycles on the selfproduct of a CM-elliptic curve over \(\Q\), J. Reine Angew. Math. 516 (1999), 1--26. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure finite ground field; zeta function of algebraic cycles; meromorphic continuation of \(L\)-function; Riemann hypothesis; order of zeros of \(L\)-function; pure \(L\)-function D. Wan, Pure L-functions from algebraic geometry over finite fields, Proceedings of the Fifth International Conference on Finite Fields, to appear. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure units in a ring; affine algebraic variety; group of units; class group; Galois cohomology; étale cohomology DOI: 10.1142/S0219498814500650 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Zariski topology; Zariski group; group of finite Morley rank; algebraic group; algebraic geometry; smooth variety; bad groups; algebraically closed field | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed Hodge modules of geometric origin; cycle map; Hodge conjectures; higher Chow groups; Bloch's conjecture | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure cohomology of quotients of group actions; equivariant cohomology; stratification; Morse function; Hodge numbers F.C. Kirwan, \textit{Cohomology of quotients in symplectic and algebraic geometry}, Princeton University Press, Princeton U.S.A. (1984). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Eichler order in indefinite quaternion algebra; hyperelliptic Shimura curve; structure of real points; Atkin-Lehner group; class numbers; Legendre symbols Ogg, A. P., \textit{real points on Shimura curves}, Arithmetic and geometry, Vol. I, 277-307, (1983), Birkhäuser, Boston, MA | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure completion of the algebraic fundamental group; motifs; projective line minus three points; realisations systems | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure deformations of Klein curve; group of automorphisms; deformations of Riemann surfaces; Torelli theorem; abelian differentials; Hodge decomposition; geodesics; quadratic differentials | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure quadratic forms; function field of a quadric; Pfister forms; Pfister neighbor; Galois cohomology; unramified cohomology; Voevodsky's motivic cohomology; Chow group B. KAHN - R. SUJATHA, Motivic cohomology and unramified cohomology of quadrics. J. Eur. Math. Soc. (JEMS), 2 no. 2 (2000), pp. 145-177. Zbl1066.11015 MR1763303 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure motivic Galois group; field of charateristic zero; triangulated motives; Hopf algebra; \(\Lambda\)-vector space | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow groups; intermediate Jacobians; Albanese map; algebraic surfaces; Bloch conjecture --. --. --. --., Some results on Green's higher Abel-Jacobi map , Ann. of Math. (2) 149 (1999), 451--473. JSTOR: | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure survey; analytic cover of a torus; ultrametric analysis; infinitesimals; finite-dimensional algebra over algebraically closed fields; finite Morley rank; analytic methods; compact complex manifold; strongly minimal structure; Zariski-type structure; algebraic curve B. Zilber, On model theory, non-commutative geometry and physics, manuscript. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure open algebraic surface; degree; finite order; automorphism group of complement of plane algebraic curve -, Projective plane curves and the automorphism groups of their complements (to appear). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic geometry; classification of \(g_n^1\) elliptic curve; solvable in radicals; monodromy group | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bloch-Beilinson conjectures; zero-cycles; special three-folds of general type and without regular 1-; 2- and 3-forms | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure action of reductive algebraic group; determinantal variety; fat points DOI: 10.4134/JKMS.2002.39.6.821 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed Hodge modules; variation of Hodge structure Donu, A.: Mixed Hodge Structures Associated to Geometric Variations, Cycles, Motives and Shimura Varieties. Tata Inst. Fund. Res, Mumbai (2011) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois representations; Tate's lifting theorem; algebraic automorphic representations; Langlands group; motives for motivated cycles; monodromy; Kuga-Satake construction; hyperkähler varieties | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure upper bounds for solutions of diophantine equations; Runge theorem; finiteness of number of solutions; Brauer-Siegel theorem; Baker-Coates theory; linear forms in logarithms of algebraic numbers; \(p\)-adic case; representation of numbers by binary forms; Thue equation; rational approximations to algebraic numbers; effective strengthening of Liouville inequality; solution of Thue equation in \(S\)-integers; non-Archimedean metrics; polynomial equation; Mordell equation; Catalan equation; size of ideal class group; small regulator; effective variants of Hilbert on irreducibility of polynomials; Abelian points on algebraic curves Sprindžuk, Vladimir G., Classical Diophantine Equations, Lecture Notes in Mathematics 1559, xii+228 pp., (1993), Springer-Verlag, Berlin | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure definition of an affine algebraic group; group inversion | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure inverse problem of Galois theory; Fischer-Griess monster as Galois group over \(\mathbb{Q}\); finite simple groups; fundamental group; rigid simple groups; cyclotomic field; discrete subgroups of \(PSL_2(\mathbb{R})\); congruence subgroup; modular curve; Puiseux series; group of covering transformations; compact Riemann surface; algebraic function field; ramification points; cusps J. Thompson , Some finite groups which appear as Gal (L/K) where K \subset Q(\mu n) , J. Alg. 89 (1984) 437-499. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure weakly ample Kähler manifolds; strongly irregular varieties; monodromy group; weak local Torelli problem; period map; Grothendieck-Riemann-Roch theorem; limiting mixed Hodge structure Loring W. Tu, Hodge theory and the local Torelli problem, Mem. Amer. Math. Soc. 43 (1983), no. 279, vi+64. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero cycle; divisor; jet bundle; embeddings; spannedness of line bundle; Picard group Mauro Beltrametti and Andrew J. Sommese, On \?-spannedness for projective surfaces, Algebraic geometry (L'Aquila, 1988) Lecture Notes in Math., vol. 1417, Springer, Berlin, 1990, pp. 24 -- 51. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Variation of Hodge structure; Calabi-Yau threefold Green, Mark and Griffiths, Phillip and Kerr, Matt, Some enumerative global properties of variations of {H}odge structures, Moscow Mathematical Journal, 9, 3, 469-530, (2009) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semisimple algebraic group; Borel subgroup; representation theory; cohomology of line bundles Humphreys, J.E.: Cohomology ofG/B in characteristicp. Adv. Math.59 170--183 (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow groups; Biextensions; algebraic cycles; intersection index; Chow categories; \(K\)-cohomology; adelic resolution | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure motives; algebraic cycles; Generalized Kummer varieties; Chow groups; finite-dimensional motives; Enriques varieties | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure highest weight categories; module category; quasi-hereditary algebra; representations of a reduction algebraic group; highest weights; dominant weights; recollement; derived category of rational \(G\)-modules Parshall, B.: Hyperalgebras, highest weight categories and finite dimensional algebras. Contemp. Math.110, 203--215 (1990) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure connected semi-simple algebraic group; maximal torus; coordinate ring; module of derivations; toral arrangements; character group C. Macmeikan, Modules of derivations for toral arrangements, Indag. Math. (N.S.) 15(2) (2004), 257\Ndash267. \small\texttt DOI: 10.1016/S0019- \small\texttt 3577(04)90018-3. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Heisenberg level structure; linear action; Heisenberg group; global sections of a line bundle | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group of automorphisms of affine space; actions of finite dimensional algebraic groups; non-triangular actions of the additive group V. Popov, On actions of \(G_a\) on \(A^n\) , in Algebraic groups , \nLecture Notes in Math., 1271 (1986), 237-242. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure existence of rational maps between K3 surfaces; lattice of cohomology classes of transcendental cycles; Hodge decomposition Nikulin, V.: On rational maps between \(K3\) surfaces. In: Constantin Carathéodory: an International Tribute, vols. I, II, pp. 964-995. World Sci. Publ., Teaneck (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure automorphism group of complex algebraic surface I. Dolgachev, Infinite Coxeter groups and automorphisms of algebraic surfaces, The Lefschetz centennial conference, Part I (Mexico City, 1984) Contemp. Math., vol. 58, Amer. Math. Soc., Providence, RI, 1986, pp. 91 -- 106. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure connected solvable group; completely regular algebraic monoids; group of units; toric data; orthodox monoids Renner, L. E., ''Algebraic monoids,'' Univ. of British Columbia, 1982. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linearization of semisimple groups; flat algebraic group scheme; equivariant resolution Thomason, R. W., \textit{equivariant resolution, linearization, and hilbert's fourteenth problem over arbitrary base schemes}, Adv. Math., 65, 16-34, (1987) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero cycle; Chow group; Brauer group; \(p\)-adic field Colliot-Thélène, Jean-Louis; Saito, Shuji, Zéro-cycles sur LES variétés \textit{p}-adiques et groupe de Brauer, Int. Math. Res. Not., 4, 151-160, (1996), MR 1385140 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure cup-products; vanishing cycles; mixed Hodge structure V. Navarro Aznar, Sur les structures de Hodge mixtes associées aux cycles évanescents, Hodge theory (Sant Cugat, 1985), Lecture Notes in Math., 1246, pp. 143-153, Springer-Verlag, Berlin, 1987. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Weil conjectures; algebraic correspondences; standard conjecture of Lefschetz type doi:10.1007/s002220050140 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure moduli space of smooth projective curves; mixed Hodge structure; Satake compactification; variation of Hodge structure Kabanov, The second cohomology with symplectic coefficients of the moduli space of smooth projective curves, Compos. Math. 110 pp 163-- (1998) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure abelian variety; group of rational points; finite field; Newton polygon; Hodge polygon Rybakov, S., On classification of groups of points on abelian varieties over finite fields, Mosc. Math. J., 15, 4, 805-815, (2015) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure character variety; Hodge-Deligne polynomial; E-polynomial; parabolic Higgs bundles; doubly periodic instantons; representations of fundamental group; punctured curves | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure groups; linear algebra; infinite dimensional spaces; systems of linear differential equations; symmetry; finite subgroups of rotation group; free groups; generators; relations; Todd-Coxeter algorithm; bilinear forms; spectral theorems; linear groups; group representations; rings; algebraic geometry; factorization; modules; function fields and their relations to Riemann surfaces; Galois theory | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow ring; BP-theory; extraspecial 2-group; classifying space; algebraic cobordism; mod-2 cohomology | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure complement of a union of hyperplanes; weights; mixed Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure toric varieties; cone structure; resolution of singularities; fundamental groups; Euler characteristics; cohomology of line bundles; tangent bundle; Serre duality; Betti numbers; Chow groups; cohomology groups W. Fulton, \textit{Introduction to toric varieties}, Annals of Mathematics Studies, Princeton University Press, Princeton U.S.A. (1993). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linearization of algebraic group action | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure real algebraic GM-manifold; complex conjugation; Euler characteristic; rational equivalence of cycles V. A. Krasnov, ''Algebraic cycles on a real algebraic GM-variety and their applications,'' Izv. Ross. Akad. Nauk Ser. Mat. [Russian Acad. Sci. Izv. Math.], 57 (1993), no. 4, 153--173. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois cohomology; \(K\)-cohomology; motivic complex; Galois covering; action of Galois group; equivariant Chow group; totally \(k\)-negligible classes Peyre, E.: Application of motivic complexes to negligible classes. In: Algebraic K-theory, Raskind, W., Weibel, C., eds., (Seattle, 1997) Proc. Symp. Pure Math., vol. 67, pp. 181--211. AMS, Providence (1999) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Mayer-Vietoris; localization; functoriality; projective bundle formula; rational Chern classes; higher Chow groups; algebraic cycles Levine, Marc, Bloch's higher Chow groups revisited, Astérisque, 226, 10, 235-320, (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linear forms with algebraic coefficients; lower bound; logarithms of algebraic points; commutative algebraic group | 0 |
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