Cyclic homology for bornological coarse spaces

Abstract

We define Hochschild and cyclic homologies for bornological coarse spaces: for a fixed field k and group G, these are lax symmetric monoidal functors XHHkG and XHCkG from the category of equivariant bornological coarse spaces GBornCoarse to the cocomplete stable ∞-category of chain complexes Ch∞. We relate these equivariant coarse homology theories to coarse algebraic K-theory X KGk and to coarse ordinary homology X HG by constructing a trace-like natural transformation X KkG X HG that factors through coarse Hochschild (or cyclic) homology. We further compare the forget-control map for coarse Hochschild homology with the associated generalized assembly map.