Real Hochschild homology as an equivariant Loday construction

Abstract

Equivariant Loday constructions are a means for providing geometric interpretations of equivariant homology theories. They are usually constructed for a simplicial G-set and a G-Tambara functor. We study situations where -- depending on the isotropy subgroups occurring in the simplicial G-set -- one can work with H-Tambara functors for a suitable subgroup H of G. We apply this to give an interpretation of Real Hochschild homology of discrete Eσ-rings as equivariant Loday constructions where we consider 2m-gons with a geometrically defined action of the dihedral groups D2m for all m ≥ 1. The action of symmetric groups on 1-skeleta of permutohedra also gives examples with isotropy groups C2.

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