Hamiltonian elements in algebraic K-theory

Abstract

A Hamiltonian bundle M P X (with monotone compact fibers) induces via Floer theory a type of ``bundle of A ∞ categories'' over X, with fiber given by the Fukaya category of M. Morita theory of A ∞ categories, the above picture for X=S m, and geometric representation theory yield the following: if G is a compact Lie group and R is a commutative ring then there is a natural group homomorphism π m (BG) K Catm(R) , where K Cat m (R) are a type of categorified algebraic K-theory groups of R, analogous to To\"en's secondary K-theory. We also construct underlying maps of this type to classical algebraic K-theory of R. This framework gives a geometry-powered proof that K Cat 2 (Z ) is infinitely generated (with the details to appear in a future work). This is in contrast to Quillen's finite generation result for standard algebraic K-theory of Z . Taking the Langlands dual of G, we explore a conjectural relationship between the images of the corresponding homomorphisms above.

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