KU-local zeta-functions of finite CW-complexes

Abstract

Begin with the Hasse-Weil zeta-function of a smooth projective variety over the rational numbers. Replace the variety with a finite CW-complex, replace etale cohomology with complex K-theory KU*, and replace the p-Frobenius operator with the pth Adams operation on K-theory. This simple idea yields a kind of "KU-local zeta-function" of a finite CW-complex. For a wide range of finite CW-complexes X with torsion-free K-theory, we show that this zeta-function admits analytic continuation to a meromorphic function on the complex plane, with a nice functional equation, and whose special values in the left half-plane recover the KU-local stable homotopy groups of X away from 2. We then consider a more general and sophisticated version of the KU-local zeta-function, one which is suited to finite CW-complexes X with nontrivial torsion in their K-theory. This more sophisticated KU-local zeta-function involves a product of L-functions of complex representations of the torsion subgroup of KU0(X), similar to how the Dedekind zeta-function of a number field factors as a product of Artin L-functions of complex representations of the Galois group. For a wide range of such finite CW-complexes X, we prove analytic continuation, and we show that the special values in the left half-plane recover the KU-local stable homotopy groups of X away from 2 if and only if the skeletal filtration on the torsion subgroup of KU0(X) splits completely.