Topological Hochschild homology and Zeta-values

Abstract

Using work of Antieau and Bhatt-Morrow-Scholze, we define a filtration on topological Hochschild homology and its variants TP and TC- of quasi-lci rings with bounded torsion, which recovers the BMS-filtration after p-adic completion. Then we compute the graded pieces of this filtration in terms of Hodge completed derived de Rham cohomology relative to the base ring Z. We denote the cofiber of the canonical map from grnTC-(-) to grnTP(-) by L<n-/S[2n]. Let X be a regular connected scheme of dimension d proper over Spec(Z) and let n∈Z be an arbitrary integer. Together with Weil-\'etale cohomology with compact support RW,c(X,Z(n)), the complex L<nX/S is expected to give the Zeta-value ζ*(X,n) on the nose. Combining the results proven here with a theorem recently proven in joint work with Flach, we obtain a formula relating L<nX/S, L<d-nX/S, Weil-\'etale cohomology of the archimedean fiber X∞ with Tate twists n and d-n, the Bloch conductor A(X) and the special values of the archimedean Euler factor of the Zeta-function ζ(X,s) at s=n and s=d-n. This formula is a shadow of the functional equation of Zeta-functions.