A universal coefficient theorem for actions of finite cyclic groups of square-free order on C*-algebras
Ralf Meyer, George Nadareishvili
TL;DR
This paper establishes a universal coefficient theorem for the bootstrap class in the equivariant Kasparov category specifically for finite cyclic groups of square-free order, advancing the understanding of equivariant K-theory.
Contribution
It provides a new universal coefficient theorem tailored for finite cyclic groups of square-free order within the equivariant Kasparov framework.
Findings
Proves a universal coefficient theorem for these groups.
Extends the bootstrap class analysis to new group actions.
Enhances computational tools in equivariant K-theory.
Abstract
We prove a Universal Coefficient Theorem for objects in the bootstrap class in the equivariant Kasparov category for a finite cyclic group of square-free order.
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