Bredon cohomology of finite dimensional $C_p$-spaces

For finite dimensional free $C_p$-spaces, the calculation of the Bredon cohomology ring as an algebra over the cohomology of $S^0$ is used to prove the non-existence of certain $C_p$-maps. These are related to Borsuk–Ulam type theorems, and equivariant maps related to the topological Tverberg conjecture. For certain finite dimensional $C_p$-spaces which are formed out of representations, it is proved that the cohomology is a free module over the cohomology of a point. All the calculations are done for the cohomology with constant coefficients $\mathbb{Z}/p$.

Keywords

Bredon cohomology, Mackey functor, Tverberg theorem, equivariant cohomology

2010 Mathematics Subject Classification

Primary 55N91, 55P91. Secondary 14M15, 57S17.

Full Text (PDF format)

Received 2 May 2020

Received revised 19 August 2020

Accepted 12 October 2020

Published 24 March 2021