On the higher topological Hochschild homology of Fp and commutative Fp-group algebras

Abstract

We extend Torleif Veen's calculation of higher topological Hochschild homology THH[n]*(Fp) from n≤ 2p to n≤ 2p+2 for p odd, and from n=2 to n≤ 3 for p=2. We calculate higher Hochschild homology HH*[n](k[x]) over k for any integral domain k, and HH*[n](Fp[x]/xp) for all n>0. We use this and \'etale descent to calculate HH*[n](Fp[G]) for all n>0 for any cyclic group G, and therefore also for any finitely generated abelian group G. We show a splitting result for higher THH of commutative Fp-group algebras and use this technique to calculate higher topological Hochschild homology of such group algebras for as large an n as THH[n]*(Fp) is known for.