On the K-theory of division algebras over local fields

Abstract

Let K be a complete discrete valuation field with finite residue field of characteristic p, and let D be a central division algebra over K of finite index d. Thirty years ago, Suslin and Yufryakov showed that for all prime numbers different from p and integers j ≥ 1 , there exists a "reduced norm" isomorphism of -adic K-groups NrdD/K Kj(D,Z) Kj(K,Z) such that d · NrdD/K is equal to the norm homomorphism ND/K. The purpose of this paper is to prove the analogous result for the p-adic K-groups. To do so, we employ the cyclotomic trace map to topological cyclic homology and show that there exists a "reduced trace" equivalence TrdA/S THH(A\,|\,D,Zp) THH(S\,|\,K,Zp) between two p-complete cyclotomic spectra associated with D and K, respectively. Interestingly, we show that if p divides d, then it is not possible to choose said equivalence such that, as maps of cyclotomic spectra, d · TrdA/S agrees with the trace TrA/S, although this is possible as maps of spectra with T-action.