On RO(G)-graded equivariant "ordinary" cohomology where G is a power of   Z/2

John Holler; Igor Kriz

arXiv:1506.00997·math.AT·March 22, 2017

On RO(G)-graded equivariant "ordinary" cohomology where G is a power of Z/2

John Holler, Igor Kriz

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TL;DR

This paper computes the full RO(G)-graded coefficients of Z/2-cohomology for G being a power of Z/2, advancing understanding of equivariant cohomology in this setting.

Contribution

It provides the complete RO(G)-graded coefficients for Z/2-cohomology when G is (Z/2)^n, a new explicit calculation in equivariant cohomology.

Findings

01

Complete RO(G)-graded coefficients computed for G=(Z/2)^n.

02

Enhanced understanding of equivariant cohomology structures.

03

Provides tools for further algebraic topology research.

Abstract

We compute the complete RO(G)-graded coefficients of "ordinary" cohomology with coefficients in Z/2 for G=(Z/2)^n.

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