On the K-theory of truncated polynomial algebras over the integers

Abstract

We show that the K2i(Z[x]/(xm),(x)) is finite of order (mi)!(i!)m-2 and that K2i+1(Z[x]/(xm),(x)) is free abelian of rank m-1. This is accomplished by showing that the equivariant homotopy groups of the topological Hochschild spectrum THH(Z) are finite, in odd degrees, and free abelian, in even degrees, and by evaluating their orders and ranks, respectively.