Genuine-commutative ring structure on rational equivariant K-theory for finite abelian groups

Abstract

In this paper, we build on the work from our previous paper (arXiv:2002.01556) to show that periodic rational G-equivariant topological K-theory has a unique genuine-commutative ring structure for G a finite abelian group. This means that every genuine-commutative ring spectrum whose homotopy groups are those of KUQ,G is weakly equivalent, as a genuine-commutative ring spectrum, to KUQ,G. In contrast, the connective rational equivariant K-theory spectrum does not have this type of uniqueness of genuine-commutative ring structure.