English

Equivariant Structure on Smash Powers

Algebraic Topology 2022-08-19 v3

Abstract

We provide foundations for dealing with the equivariant structure of "smash powers" of commutative orthogonal ring spectra. The category of commutative orthogonal ring spectra AA is tensored over spaces XX, so that AXA \otimes X is a commutative orthogonal ring spectrum. If XX is a discrete space, this is literally the smash power of AA with itself indexed over XX, and we keep this language also in the nondiscrete case. In particular AS1A \otimes S^1 is a model for topological Hochschild homology. We provide a framework where a generalization of the cyclotomic structure of topological Hochschild homology is visible in a categorical framework, also for more general GG and XX. Similar situations have been studied by others, e.g., in Hill, Hopkins and Ravenel's treatment of the norm construction and Brun, Carlsson, Dundas' covering homology. In the case of non-commutative AA and X=S1X=S^1, the situation is somewhat easier and has already been covered by Kro. We are motivated by applications to GG being a torus in order to study the iterated algebraic KK-theory, and have to develop a categorical theory that in some ways goes beyond what has been done before. Most of the material appeared in the last author's thesis which was defended in 2011. We apologize for the delay.

Keywords

Cite

@article{arxiv.1604.05939,
  title  = {Equivariant Structure on Smash Powers},
  author = {Morten Brun and Bjørn Ian Dundas and Martin Stolz},
  journal= {arXiv preprint arXiv:1604.05939},
  year   = {2022}
}

Comments

Fixed minor issues

R2 v1 2026-06-22T13:36:45.482Z