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zero cycles; Chow group of algebraic cycles; Hodge structure moduli space of Riemann surfaces; Deligne-Mumford compactification; spectral sequence; mixed Hodge structure; stable cohomology; tautological class; \( \operatorname{BV} \)-algebra; Maurer-Cartan equation; quantum master equation | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure automorphisms of algebraic curves; order of the automorphism group A. Seyama , A characterization of reducible abelian varieties , to appear. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure representations of the Weyl groups; connected reductive algebraic group; maximal torus T. Tanisaki: Defining ideals of the closures of the conjugacy classes and representations of the Weyl groups , Tôhoku Math. J. (2) 34 (1982), 575-585. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure residually finite rationally \(p\) group; graph of groups; \(3\)-manifold; plane algebraic curve; boundary manifold; Alexander varieties; BNS invariant | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure compactification of moduli space; moduli space of algebraic vector bundles; Picard group of the normalization; Weil divisor M. S. Narasimhan and G. Trautmann, ''The Picard group of the compactification ofM P 3(0,2),''J. reine angew. Math.,442, 21--44 (1991). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Riemann surface; Higgs bundle; moduli space; Hodge structure; fundamental group; twistor space; hyperkahler structure; groupoid Goldman, W.M., Xia, E.Z.: Rank one Higgs bundles and representations of fundamental groups of Riemann surfaces. Mem. Am. Math. Soc. \textbf{193}(904), viii+69 pp (2008) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Riemann-Roch theorem; tautological subring in the arithmetic Chow ring of bases of abelian schemes; Arakelov version of Hirzebruch proportionality principle; formula for a critical power of Hodge bundle. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Dynkin diagram; ordered bases of the Milnor lattice of a simple singularity; root system; vanishing cycles; braid-group Voigt E., Ausgezeichnete Basen von Milnorgittern einfacher Singularitäten, Bonner Math. Schriften 160 (1985). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure cover of a \(K3\) surface; Todorov surface; mixed Hodge structure; mixed period map; Torelli problem; degenerations S. Usui, Mixed Torelli problem for Todorov surfaces, Osaka J. Math. 28 (1991), 697--735. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure \(n\)-fold covering; covering group; algebraic covering; triviality of \(n\)-fold coverings; algebraic equation with functional coefficients; dual group; one dimensional Čech cohomology group Grigorian, S. A.; Gumerov, R. N., On a covering group theorem and its applications, Lobachevskii J. Math., 10, 9-16, (2002) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure variation of pure polarized Hodge structure degenerating along a divisor with normal crossings; period mapping; limit Hodge filtration; mixed Hodge structure; local monodromy; purity | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure configuration space; Torelli group; mixed Hodge structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Picard-Borel theorem for quasiprojective spaces; finiteness of; number of holomorphic mappings; Hilbert irreducibility theorem; algebraic group K. LANGMANN, Picard-Borel-Eigenschafte und Anwendungen, Math. Z., 19 (1986), 587-601. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure affine variety; unipotent algebraic group; set of fixed points Jelonek, Z; Lasoń, M, The set of fixed points of a unipotent group, J. Algebra, 322, 2180-2185, (2009) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure isomorphism classes of simple n-dimensional representation of a finitely generated group; tangents to formal curves; algebraic set; tangent cones to representation varieties DOI: 10.1007/BF02783301 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure braid group; moduli space of Riemann spheres; outer automorphisms; algebraic fundamental group; Grothendieck-Teichmüller group D. Harbater and L. Schneps: Fundamental groups of moduli and the Grothendieck--Teichmüller group , Trans. Amer. Math. Soc. 352 (2000), 3117--3148. JSTOR: | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; motives; Chow motives; algebraic surfaces; Chow groups; triangulated categories; birational motives B. Kahn, J. P. Murre, and C. Pedrini, ''On the transcendental part of the motive of a surface'' in Algebraic Cycles and Motives, Vol. 2, London Math. Soc. Lecture Note Ser. 344, Cambridge Univ. Press, Cambridge, 2007, 143--202. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure automorphism groups of algebraic function fields; realization of group as Galois group; Galois theory Henning Stichtenoth, Zur Realisierbarkeit endlicher Gruppen als Automorphismengruppen algebraischer Funktionenkörper, Math. Z. 187 (1984), no. 2, 221 -- 225 (German). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure surgery; algebraic \(K\)-theory; controlled topology; stratified spaces; manifold theory; algebraic varieties; orbit spaces of group actions; rigidity theorems Weinberger, S.: The Topological Classification of Stratified Spaces. Chicago Lectures in Mathematics. University of Chicago Press, Chicago (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure wonderful compactification; symmetric varieties; algebraic group of adjoint type; fixed points of an involution; embedding of the homogeneous space; G.I.T. quotients Kannan, S.: Remarks on the wonderful compactification of semisimple algebraic groups. Proc. indian acad. Sci. math. Sci. 109, No. 3, 241-256 (1999) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic points; height; Weil absolute logarithmic height; Mahler's measure; circle method; accumulator; Fano varieties; K3 varieties; conjecture of Batyrev and Manin; Neron--Severi group; cubic threefold; Arakelov height; Schanuel's Theorem; conjecture of Franke, Manin and Tschinkel; Northcott property; small points; Lehmer conjecture; Bogomolov property | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure inverse Galois theory; algebraic fundamental group; plane curves; factorization of polynomials; resolution of plane curve singularities; hyperelliptic function fields; construction of Galois extensions; finite group; Galois group; PSL(2,8); unramified covering; affine line Shreeram S. Abhyankar, Square-root parametrization of plane curves, Algebraic geometry and its applications (West Lafayette, IN, 1990) Springer, New York, 1994, pp. 19 -- 84. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure connected projective curve; irreducibility of \(n\)-pointed genus 0 stable maps; linear algebraic group; coarse moduli space; quotient singularities J. Thomsen : Irreducibility of \(\overline{M}_{0,n}(G/P,\beta)\), Internat. J. Math. 9, no. 3 (1998), 367-376. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure real algebraic surface; dimensions of the cohomology spaces; Hodge decomposition Silhol, R.: Real algebraic surfaces. Lecture notes in mathematics 1392 (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure generalization of class field theory; local fields; global fields; Milnor K-group; integral projective scheme; Chow group; generalization of ramification theory; higher dimensional schemes; generalized Swan conductor Kato, K. : A generalization of class field theory (Japanese) . Sûgaku 40 (1988) 289-311. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure IVHS; generic polarized Hodge structure; infinitesimal variation of Hodge structure; infinitesimal Schottky relations; moduli of curves; Gauss linear system; Jacobian system; Torelli theorem for cubic hypersurfaces James Carlson, Mark Green, Phillip Griffiths, and Joe Harris, Infinitesimal variations of Hodge structure. I, Compositio Math. 50 (1983), no. 2-3, 109 -- 205. Phillip Griffiths and Joe Harris, Infinitesimal variations of Hodge structure. II. An infinitesimal invariant of Hodge classes, Compositio Math. 50 (1983), no. 2-3, 207 -- 265. Phillip A. Griffiths, Infinitesimal variations of Hodge structure. III. Determinantal varieties and the infinitesimal invariant of normal functions, Compositio Math. 50 (1983), no. 2-3, 267 -- 324. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge conjecture; limit mixed Hodge structures; cycle class; algebraic Hodge polynomial; nodal curves; moduli space of semi-stable sheaves | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Bruhat order; algebraic group acting on an algebraic variety; maximal number of \(B\)-orbits; homogeneous spherical spaces Timashev, D.A.: A generalization of the Bruhat decomposition. Izv. Ross. Akad. Nauk Ser. Mat. \textbf{58}(5), 110-123 (1995) Translation in: Russian Acad. Sci. Izv. Math. \textbf{45}(2), 339-352 (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Selmer group; Euler system; generalized Heegner cycles; modular form; algebraic Hecke character; Galois representation | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure hypertoric varieties; conical symplectic varieties; universal cover; fundamental group of regular locus; Bogomolov's decomposition; uniqueness of symplectic structure | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic group; Chow ring; representation; Chern class Elisa Targa, Chern classes are not enough. Appendix to: ''On the cohomology and the Chow ring of the classifying space of \?\?\?_{\?}'' [J. Reine Angew. Math. 610 (2007), 181 -- 227; MR2359886] by A. Vistoli, J. Reine Angew. Math. 610 (2007), 229 -- 233. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure normal function; admissible variation of mixed Hodge structure Brosnan, P., Pearlstein, G.: Zero loci of admissible normal functions with torsion singularities. Duke Math. J. 150(1), 77--100 (2009) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure real algebraic sets; compact surface; first homology group not generated by algebraic cycles Kucharz W.: On homology of real algebraic sets. Invent. Math. 82, 19--26 (1985) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed motive; algebraic \(K\)-theory of a scheme; Bloch-Ogus cohomology theory; motivic cohomology; triangulated tensor category; cycle formalism; motivic differential graded category; higher Chow groups; cycle class maps; \(K\)-theory; Chern classes; Riemann-Roch theorem; Chern character; Tannakian categories; triangulated Tate motivic category Marc Levine, Mixed motives, Mathematical Surveys and Monographs 57, American Mathematical Society, 1998 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Euler characteristic; Galois module structure; generalization of Taylor's theorem; arithmetic schemes of arbitrary dimension; class group invariant; deRham cohomology; \(\varepsilon\)-factors Chinburg, T.; Pappas, G.; Taylor, M. J.: {\(\epsilon\)}-constants and the Galois structure of de Rham cohomology. II. J. reine angew. Math. 519, 201-230 (2000) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Calabi-Yau manifolds; strong fields; Hodge theory; nuclear algebraic surfaces; irreducible representation of SO(10); string theory | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure quadratic forms; \(K\)-theory; Chow groups and motives; motives of quadrics;discrete invariants of quadrics; algebraic cobordism; \(u\)-invariants of fields | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semisimple complex algebraic group; parabolic subgroups; twisted holomorphic differential operators; real analytic line bundle; sheaf of distribution sections; spherical representations; semisimple symmetric spaces | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois theory; algebraic fundamental groups; finite simple group; wreath product; Galois group; unramified covering of the affine line; group enlargements; enlargements; tame fundamental groups of curves Abhyankar, S. S.: Group enlargements. CR acad. Sci. Paris 312, 763-768 (1991) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure fundamental group of the complement of an algebraic curve; roots of the Alexander polynomial | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Stiefel-Whitney classes; Chern classes; Pontryagin classes; cohomology of sheaves; derived functors of the global section functor; cohomology with compact support; soft sheaves; De Rham theorem; Poincaré duality; local cohomology; submanifolds; degree; trace maps; diagonal class; algebraic varieties; algebraic cycles; local intersection symbol; resolutions of soft sheaves; distributions; hyperfunctions Iversen, B.: Cohomology of Sheaves. Lecture Notes Series, vol. 55. Aarhus Universitet Matematisk Institut, Aarhus (1984) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hitchin fibrations; non-abelian Hodge theory; algebraic surfaces; commuting schemes; Hilbert scheme of points | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Grassmann variety; structure of the Chow ring | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure compact orientable smooth manifold; subgroup of two dimensional algebraic cycles in an algebraic model; Poincaré dual of the second Stieffel- Whitney class Bochnak J., Kucharz W.: Algebraic cycles and approximation theorems in real algebraic geometry. Trans. Am. Math. Soc. 337, 463--472 (1993) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge decomposition; automorphism group of a complex K3-surface; sporadic Mathieu group Mason, G., Symplectic automorphisms of K3-surfaces (after S. Mukai and V.V. nikulin), CWI Newslett., 13, 3, (1986) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Hodge structure of even-dimensional quadric bundles; theta- characteristic; generic Torelli theorem Laszlo, Y.: Théorème de Torelli générique pour LES intersections complètes de trois quadriques de dimension paire. Invent. math. 98, 247-264 (1989) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic group; stationary subgroup of general position | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure \(p\)-adic deformation; algebraic cycles; crystalline Chern character; de Rham cohomology; Hodge filtration; de Rham-Witt complex; Grothendieck's variational Hodge conjecture; Fontaine-Messing's \(p\)-adic variational Hodge conjecture; motivic pro-complex; Suslin-Voevodsky motivic complex; Fontaine-Messing-Kato syntomic complex; fundamental triangle; crystalline Hodge obstruction; topological cyclic homological theory; Milnor \(K\)-theory Bloch, S.; Esnault, H.; Kerz, M., \textit{p}-adic deformation of algebraic cycle classes, Invent. Math., (2013) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure alternative algebra; quadratic algebra; composition algebras; algebraic curves of genus zero; locally ringed spaces; Cayley-Dickson doubling process; Zorn's vector matrices; octonion algebras; Zorn algebras; function fields of genus zero; polynomial rings Petersson, H.: Composition algebras over algebraic curves of genus 0. Trans. Am. Math. Soc. 337, 473--491 (1993) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure finitely generated modules; trace ideals; finite groups; skew group rings; actions; rings of invariants; symmetric algebras; rational representations; reductive algebraic groups M. P. Holland, \(K\)-theory of endomorphism rings and of rings of invariants , J. Algebra 191 (1997), no. 2, 668-685. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure reductive complex algebraic group; algebra of invariant polynomial functions; invariant theory of binary cubics Schwarz, G. W.: On classical invariant theory and binary cubics. Ann. inst. Fourier 37, 191-216 (1987) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic fundamental group; local fundamental group; stratification theory of complex spaces J. Bingener,H. Flenner, Variation of the fundamental groups of schemes. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure moduli space; semi-stability; reductive group; Bruhat-Tits theory; reduction of structure group; anti self-dual Yang-Mills connection; singular principal bundle; Dynkin index; Giseker-Maruyama stable Balaji, V.: Principal bundles on projective varieties and the Donaldson-Uhlenbeck compactification. J. Differential Geom. 76 (2007), no. 3, 351-398. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure completion of algebraic group; action of algebraic group; Hilbert scheme Michel Brion, Group completions via Hilbert schemes, J. Algebraic Geom. 12 (2003), 605-626. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Chow groups; zero-zycles; Abel morphism; singular projective surface; Grothendieck group M. Levine and V. Srinivas : Zero-cycles on certain singular elliptic surfaces . Comp. Math. 52 (1984) 179-196. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure von Neumann regular; irreducible varieties; irreducible affine algebraic monoid; group of units Renner, L. E.,Reductive monoids are von Neumann regular, J. of Algebra93 (1985), 237--245. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic surfaces of positive index; Chern numbers; Bogomolov-Miyaoka- Yau inequality; watershed conjecture; surface of general type; linear system; fundamental group B. Moishezon and M. Teicher, ''Simply-connected algebraic surfaces of positive index,'' Invent. Math., vol. 89, iss. 3, pp. 601-643, 1987. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Galois group; general linear group; algebraic fundamental group; unramified covering of the affine line; general semilinear group Abhyankar S S, Semilinear transformations,Proc. Am. Math. Soc. 127 (1999) 2511--2525 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semidefinite programming (SDP); linear matrix inequality (LMI); convex semialgebraic sets; determinantal representations of polynomials or of hypersurfaces; kernel sheaves; real zero (RZ) polynomials; rigidly convex algebraic interiors; interlacing polynomials; hyperbolic polynomials Vinnikov, Victor, LMI representations of convex semialgebraic sets and determinantal representations of algebraic hypersurfaces: past, present, and future.Mathematical methods in systems, optimization, and control, Oper. Theory Adv. Appl. 222, 325-349, (2012), Birkhäuser/Springer Basel AG, Basel | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure singular surfaces; cubic surfaces; intersections of quadrics; singular del Pezzo surfaces; classification into birational equivalence classes; rationality of the surfaces; Hasse principle; Iskovskih surfaces; Chow group; Brauer group Daniel François Coray & Michael A. Tsfasman, ``Arithmetic on singular Del Pezzo surfaces'', Proc. Lond. Math. Soc.57 (1988) no. 1, p. 25-87 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure complement of nonsingular real algebraic curve; fundamental group; homotopic type | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure group cohomology; algebraic cycles Totaro, B., Group Cohomology and Algebraic Cycles, pp., (2014), Cambridge University Press | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure semisimple adjoint algebraic group; large Schubert varieties; Picard group; filtration; algebra of regular functions; flag variety; equivariant \(K\)-theory Brion, M; Polo, P, Large Schubert varieties, Represent. Theory, 4, 97-126, (2000) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Poincaré series; parameter system; invariants of action of algebraic group T. A. Springer, Aktionen reduktiver Gruppen auf Varietäten , Algebraische Transformationsgruppen und Invariantentheorie, DMV Sem., vol. 13, Birkhäuser, Basel, 1989, pp. 3-39. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure irrationality; polarized mixed Hodge structure; smooth complex; projective 3-fold; degenerating family of abelian varieties with principal; polarization; degenerating family of abelian varieties with principal polarization F. Bardelli, ''Polarized mixed Hodge structures: On irrationality of threefolds via degeneration,''Ann. Mat. Pura et Appl.,137, 287--369 (1984). | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure essential dimension; central simple algebras; projective linear groups; lattices; essential \(p\)-dimension; Brauer groups; Severi-Brauer varieties; \(R\)-equivalence; Chow groups; character groups of algebraic tori A. Meyer, Z, Reichstein, An upper bound on the essential dimension of a central simple algebra, J. Algebra 329 (2011), 213--221. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Shimura variety; Siegel modular form; Jacobi form; Chow group; special cycles; Stone-von Neumann theorem Raum, Martin, Spans of special cycles of codimension less than 5, J. Reine Angew. Math., 718, 39-57, (2016) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure surface, smooth, projective, algebraic; Lefschetz pencil; triviality of vanishing cycles Lvovski, S.: Some remarks on osculating self-dual varieties. arXiv:1602.07450 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure germs of holomorphic mappings with an isolated zero; Łojasiewicz exponent; effective formula for the algebraic multiplicity | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Beauville structure; Beauville group; free group; free product of groups | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic schemes; algebraic spaces; group actions; D-modules; adjoint functors; derived categories of sheaves; torus actions V. Drinfeld and D. Gaitsgory: \textit{On a theorem of Braden}. arXiv:1308.3786 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure incidence locus; Cartier divisor; Chow variety; algebraic cycles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic K3 surfaces; Néron-Severi group; finite generation of; automorphism group; finite number of orbits; reduction theory Sterk H.: Finiteness results for algebraic K3 surfaces. Math. Z. 189, 507--513 (1985) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic cycles; Chow motives; \(K3\) surfaces; Nikulin involutions | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed Hodge structure; isolated complete intersection singularities; symmetry of spectral pairs; semicontinuity of spectral pairs Ebeling, W.; Steenbrink, J.H.M., Spectral pairs for isolated complete intersection singularities, J. algebraic geom., 7, 1, 55-76, (1998) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure linear algebraic group; Chow ring; exceptional group P. Guillot, The Chow ring of G 2 and Spin(7), J. Reine Angew. Math. 604 (2007), 137-158. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure representation space; corepresentation; Betti moduli space; representations of the fundamental group; de Rham moduli space; Dolbeault moduli space; Higgs bundles; Higgs sheaf; integrable connections; algebraic connection Simpson, C., Moduli of representations of the fundamental group of a smooth projective variety, II. Inst. Hautes Čtudes Sci. Publ. Math. No, 80, 5-79, (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Euler-Chow series; Cox rings; algebraic cycles; linear systems Chen, X.; Elizondo, E. J.; Yang, Y.: Rationality of Euler-Chow series and finite generation of Cox rings | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure complete intersection; linear subspaces of dimension \(r\); Bott's theorem; vanishing theorem; bundles on the Grassmannian; Chow group; unirational Debarre, O.; Manivel, L., Sur la variété des espaces linéaires contenus dans une intersection complète, Math. Ann., 312, 549-574, (1998) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Abel-Jacobi map; higher Chow group; regulator map; absolute Hodge cohomology Kerr M. and Lewis J.\ D., The Abel-Jacobi map for higher Chow groups, II, Invent. Math. 170 (2007), no. 2, 355-420. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure higher Chow groups; category of mixed motives; exact faithful functor; mixed Hodge structures; Albanese map Asakura, M.: Motives and algebraic de Rham cohomology. The arithmetic and geometry of algebraic cycles, Proceedings of the CRM Summer School. CRM Proc. Lect. Notes \textbf{24}, 133-155 (2000) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure finite number of orbits; multiplicity-free representation; algebraic group; equivariant open embedding A. A. Davydov, ''Normal Form of a Differential Equation, Not Solvable for the Derivative, in a Neighborhood of a Singular Point,'' Funkts. Anal. Prilozh. 19(2), 1--10 (1985) [Funct. Anal. Appl. 19, 81--89 (1985)]. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure elliptic surface; lattice of transcendental cycles; Néron-Severi group; functional invariant; homological invariant [MN] Mangala Nori:On the lattice of transcendental cycles. Math. Zeit.193 (1986) 105-112. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Substitutions; primitive group; order; bound; number of cycles; functions; odd prime number; alternate; k-times transitive; linear group | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure reconstruction theorem; abelian category; noncommutative algebraic geometry; quasi-coherent sheaves; automorphism class group; quasi-separated scheme; the spectrum of $\mathcal A$; equivalence of groupoids; automorphism class group; derived category of coherent sheaves; tensor triangulated category of perfect complexes; Tannaka duality | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure motive; motivic cohomology; Chow groups; numerical equivalence of cycles | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebra of invariant polynomials; algebraic quotients of reductive groups; Hilbert-Mumford group; representation of classical groups H. Kraft, \textit{Geometrische Methoden in der Invariantentheorie}, Vieweg, 1984. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure surfaces of general type; tautness; deformations; finite characteristic; algebraic fundamental group G. Urzúa, \textit{Identifying neighbors of stable surfaces}, Annali della Scuola Normale Superiore di Pisa, to appear. arXiv:1310.4353 [math.AG]. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic variety; bivariant theory; intersection product; Chern-Schwartz-MacPherson class; specialization; Grothendieck transformation; characteristic function; Chow group; push-forward; pull-back L Ernström, S Yokura, Bivariant Chern-Schwartz-MacPherson classes with values in Chow groups, Selecta Math. 8 (2002) 1 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure zero-cycles; torsors; linear algebraic groups | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure configuration space; Hodge structure; mixed Hodge module; moduli space of elliptic curves Ayala, D., Francis, J.: Poincaré/Koszul duality (2014). arXiv:1409.2478 | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure smooth principal divisor; K-theory; \(K_ 0\); algebraic cycles of codimension m S. Landsburg, Algebraic cycles relative to a smooth principal divisor , Comm. Algebra 16 (1988), no. 4, 859-868. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure derived category of motives; Chow group; motivic cohomology; mixed Tate motive; adjoint functor | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure invariants of k-jet actions; action of a complex algebraic group; algebras of invariants; gauge-field theories Eck, D.J., Invariants of \textit{k}-jet actions, Houston J. math., 10, 2, 159-168, (1984) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebra of invariant polynomials; algebraic quotients of reductive groups; Hilbert-Mumford group; representation of classical groups Kraft, H., Geometricheskie metody v teorii invariantov (Geometric Methods in Invariant Theory), Moscow, 1987. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure topology on group of \(p\)-cycles; Chow varieties; Lawson homology Lima-Filho, The topological group structure of algebraic cycles, Duke Math. J. 75 (2) pp 467-- (1994) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure complex analytic groups; complex Hopf algebras of representative functions; complex algebraic group; analytic embeddings; semi-direct product; maximal reductive subgroup; normal reduced split hull; semi- simple representations | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure mixed Hodge theory; homotopy of a complex algebraic variety; neighborhood of a subvariety; links of isolated singular points; cup product; decomposition theorem of intersection homology Hain, R.M. and Durfee, A.: Mixed Hodge structures on the homotopy of links. Math. Ann.,280, 69--83 (1988) | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure algebraic geometry; schemes; sheaves; cohomology; resolution of singularities; intersection theory; enumerative algebraic geometry; Hodge theory; Weil conjectures; moduli problems; arithmetical algebraic geometry Ciro Ciliberto, The geometry of algebraic varieties, Development of mathematics 1950 -- 2000, Birkhäuser, Basel, 2000, pp. 269 -- 312. | 0 |
zero cycles; Chow group of algebraic cycles; Hodge structure Betti number of an abelian covering of a \(CW\)-complex; cyclotomic coordinates; fundamental group; complement to an algebraic curve; link; Alexander polynomials of plane algebraic curves Libgober A.: On the homology of finite abelian coverings. Topol. Appl. 43(2), 157--166 (1992) | 0 |
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