This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
B. Gordon, J. Lewis, S. Müller-Stach, S. Saito and N. Yui (editors): The Arithmetic and Geometry of Algebraic Cycles, Nato science series, Kluwer Acad. Publ. 548 (2000).
A. Beilinson: Higher regulators and values of L-functions of curves, Funct. Anal. Appl. 14, 116–118 (1980).
S. Bloch: Algebraic cycles and higher K-theory, Adv. in Math. 61, 267–304 (1986).
S. Bloch: Algebraic cycles and the Beilinson conjectures. Cont. Math. 58 Part I, 65–79 (1986).
S. Bloch: The moving lemma for higher Chow groups, J. Algebraic Geom. 3, no. 3, 537–568 (1994).
S. Bloch, I. Kriz: Mixed Tate motives, Annals of Math. 140, 557–605 (1995).
A. Borel: Stable real cohomology of arithmetic groups, Ann. Sci. ENS 4, 235–272 (1974).
Ph. Boalch: Symplectic manifolds and isomonodromic deformations, Adv. Math. 163, 137–205 (2001).
J. Chazy: Sur les équations différentielles du troisième ordre et d’ordre supérieur dont l’intégrale générale a ses points critiques fixes, Acta Math. 34, 317–385 (1910).
J. Carlson: Extensions of mixed Hodge structures, Proceedings Journées de Géometrie Algébrique d’Angers 1979, Sijthoff and Noordhoff, 107–127, (1980).
J. Carlson, S. Müller-Stach and Ch. Peters: Period maps and period domains, Cambridge Studies in advanced math. 85, Cambridge University Press (2003).
A. Collino: Griffiths’ infinitesimal invariant and higher K-theory of hyperelliptic Jacobians, Journ. of Alg. Geom. 6, 393–415 (1997).
P. L. del Angel and S. Müller-Stach: The transcendental part of the regulator map for K 1 on a mirror familiy of K3 surfaces, Duke Math. Journal 112, 581–598 (2002).
P. L. del Angel and S. Müller-Stach: The transcendental part of the regulator map for K 1 on a mirror family of K3 surfaces, Version 1, preprint available on math.AG/0008207v1 (2000).
P. L. del Angel and S. Müller-Stach: Picard-Fuchs equations, Integrable Systems and higher algebraic K-Theory, Fields Inst. Comm. Vol. 38, Amer. Math. Soc., 43–55 (2003).
P. L. del Angel and S. Müller-Stach: Differential Systems associated to families of algebraic cycles, Preprint 2005.
C. Deninger and T. Scholl: The Beilinson conjectures, in: L-functions and arithmetic (Durham, 1989), London Math. Soc. Lecture Note Ser. 153, Cambridge Univ. Press, Cambridge, 173–209 (1991).
Ph. Elbaz-Vincent and S. Müller-Stach: Higher Chow groups, Milnor Ktheory, and applications, Inventiones Math., 148, 177–206 (2002).
H. Esnault and E. Viehweg: Deligne-Beilinson cohomolgogy, in M. Rapoport, N. Schappacher and P. Schneider (eds.) Beilinson’s conjectures on special values of L-functions, Academic Press, 43–91 (1990).
R. Fuchs: Über lineare homogene Differentialgleichungen zweiter Ordnung mit drei im Endlichen gelegenen wesentlich singulären Stellen, Math. Ann. 63, 301–321 (1907).
H. Gangl and S. Müller-Stach: Polylogarithmic identities in higher Chow groups, Seattle Conference on Algebraic K-theory, Proc. of Symp. in Pure Math 67, 25–40 (1999).
W. Gerdes: The linearization of higher Chow groups of dimension one, Duke Math. Journal 62, 105–129 (1991).
A. Goncharov: Chow polylogarithms and regulators, Math. Research Letters 2, 95–112 (1995).
B. B. Gordon, M. Hanamura, and J. P. Murre: Absolute Chow-Künneth projectors for modular varieties, Crelle Journal 580, 139–155 (2005).
Ph. Griffiths: A theorem concerning the differential equations satisfied by normal functions associated to algebraic cycles, Amer. J. Math. 101, 94–131 (1979).
F. Hirzebuch: Chern numbers of algebraic surfaces — an example, Math. Annalen 266, 351–356 (1984).
R.-P. Holzapfel: Chern numbers of algebraic surfaces — Hirzebruch’s examples are Picard modular surfaces, Math. Nachrichten 126, 255–273 (1986).
J. Jost, Y.-H. Yang and K. Zuo: The cohomology of a variation of polarized Hodge structures over a quasi-compact Kähler manifold, preprint math.AG/0312145 (2003).
M. Kerr: Thesis, Princeton 2002.
M. Kerr, J. Lewis and S. Müller-Stach: The Abel-Jacobi map for higher Chow groups, Compositio Math. 142, 374–396 (2006).
M. KERZ and S. MÜLLER-STACH: The Milnor-Chow homomorphism revisited, to appear in K-theory (2006).
M. Levine: Bloch’s higher Chow groups revisited, in Astérisque 226, 235–320 (1994).
M. Levine: Lambda operations, K-theory and motivic cohomology, Proceedings of the Fields Institute No. 16, AMS, 131–184 (1997).
M. Levine: K-theory and Motivic cohomology of schemes, preprint (1999).
M. Levine: Mixed Motives, AMS Math. Surveys 57 (1998).
Y. I. Manin: Sixth Painlevé equation, universal elliptic curve and mirror of ℙ2, Amer. Math. Soc. Translations (2), Vol. 186, 131–151 (1998).
A. Miller, S. Müller-Stach, S. Wortmann, Y.-H. Yang and K. Zuo: Chow-Künneth decomposition for universal families over Picard modular surfaces, Preprint math.AG/0505017 (2005), to appear in Proceedings Murre conference.
S. Müller-Stach: Constructing indecomposable motivic cohomology classes on algebraic surfaces, Journ. of Alg. Geom. 6, (1997), 513–543. Journal of Alg. Geom. 1997.
S. Müller-Stach and S. Saito (Appendix by A. Collino): On K1and K2of algebraic surfaces, Bass volume, K-theory 30, 37–69 (2003)
J. P. Murre: Lectures on Motives, in Proceedings Transcendental Aspects of Algebraic Cycles, eds. S. Müller-Stach and Ch. Peters, Grenoble 2001, LMS Lectures Note Series 313, Cambridge Univ. Press, 123–170 (2004).
E. Nart: The Bloch complex in codimension one and arithmetic duality, J. Number Theory 32, 321–331 (1989).
E. Picard: Sur des fonctions de deux variables indépendantes analogues aux fonctions modulaires, Acta. Math. 2, 114–135 (1883).
C. Simpson: Constructing variations of Hodge structure using Yang-Mills theory and applications to uniformization, J. Am. Math. Soc. 1, No.4, 867–918 (1988).
W. Raskind: Higher l-adic Abel-Jacobi mappings and filtrations on Chow groups, Duke Math. Journal 78, 33–57 (1995).
S. Saito: Motives and Filtrations on Chow groups, Inventiones Math. 125, 149–196 (1996).
B. Totaro: Milnor K-theory is the simplest part of algebraic K-theory, K-theory 6, 177–189 (1992).
V. Voevodsky, E. Friedlander and A. Suslin: Cycles, transfers, and motivic cohomology theories, Annals of Math. Studies 143, Princeton Univ. Press (2000).
C. Voisin: Variations of Hodge structure and algebraic cycles, Proceedings of the ICM, Zürich, 1994, (S.D. Chatterji ed.), Birkhäuser, Basel, (1995), 706–715.
D. ZagierPolylogarithms Dedekind zeta functions and the algebraic K-theory of fields Arithmetic Algebraic Geometry Texel 1989 Oort Steenbrink van der Geer eds. Birkhäuser Prog. in Math. 89 391–430 1991.
J. Zhao (appendix by H. Gangl): Goncharov’s relations in Bloch’s higher Chow group CH3(F, 5), to appear in Journal of Number theory.
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2006 Springer-Verlag Berlin Heidelberg
About this chapter
Cite this chapter
Müller-Stach, S.J. (2006). Hodge Theory and Algebraic Cycles. In: Catanese, F., Esnault, H., Huckleberry, A.T., Hulek, K., Peternell, T. (eds) Global Aspects of Complex Geometry. Springer, Berlin, Heidelberg . https://doi.org/10.1007/3-540-35480-8_12
Download citation
DOI: https://doi.org/10.1007/3-540-35480-8_12
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-35479-6
Online ISBN: 978-3-540-35480-2
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)