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Techniques, computations, and conjectures for semi-topological K-theory
Author(s) -
Eric M. Friedlander,
Christian Haesemeyer,
Mark E. Walker
Publication year - 2004
Publication title -
mathematische annalen
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 2.235
H-Index - 75
eISSN - 1432-1807
pISSN - 0025-5831
DOI - 10.1007/s00208-004-0569-3
Subject(s) - mathematics , spectral sequence , cohomology , motivic cohomology , pure mathematics , algebraic variety , topology (electrical circuits) , sequence (biology) , group cohomology , algebraic number , algebra over a field , de rham cohomology , equivariant cohomology , combinatorics , mathematical analysis , genetics , biology
. We establish the existence of an “Atiyah-Hirzebruch-like” spectral sequence relating the morphic cohomology groups of a smooth, quasi-projective complex variety to its semi-topological K-groups. This spectral sequence is compatible with (and, indeed, is built from) the motivic spectral sequence that relates the motivic cohomology and algebraic K-theory of varieties, and it is also compatible with the classical Atiyah-Hirzebruch spectral sequence in algebraic topology. In the second part of this paper, we use this spectral sequence in conjunction with another computational tool that we introduce — namely, a variation on the integral weight filtration of the Borel-Moore (singular) homology of complex varieties introduced by H. Gillet and C. Soulé – to compute the semi-topological K-theory of a large class of varieties. In particular, we prove that for curves, surfaces, toric varieties, projective rational three-folds, and related varieties, the semi-topological K-groups and topological K-groups are isomorphic in all degrees permitted by cohomological considerations. We also formulate integral conjectures relating semi-topological K-theory to topological K-theory analogous to more familiar conjectures (namely, the Quillen-Lichtenbaum and Beilinson-Lichtenbaum Conjectures) concerning mod-n algebraic K-theory and motivic cohomology. In particular, we prove a local vanishing result for morphic cohomology which enables us to formulate precisely a conjectural identification of morphic cohomology by A. Suslin. Our computations verify that these conjectures hold for the list of varieties above.

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