The non-nil-invariance of TP

Abstract

Hesselholt defined a spectrum TP(X), the periodic topological cyclic homology of a scheme X, using topological Hochschild homology and the Tate construction, which is a topological analogue of Connes-Tsygan periodic cyclic homology HP defined by Hochschild homology and the Tate construction. Goodwillie proved that for R an algebra over a field of characteristic 0 and I a nilpotent ideal of R, the quotient map R R/I induces an isomorphism on HP. In this paper, we show that the analogous result for TP does not hold, that is to say, there is an algebra of positive characteristic and a nilpotent ideal such that the quotient map does not induce an isomorphism on TP, even rationally.