The ring structure for equivariant twisted K-theory

Abstract

We prove, under some mild conditions, that the equivariant twisted K-theory group of a crossed module admits a ring structure if the twisting 2-cocycle is 2-multiplicative. We also give an explicit construction of the transgression map T1: H*(;A) H*-1((N ;A) for any crossed module N and prove that any element in the image is ∞-multiplicative. As a consequence, we prove that, under some mild conditions, for a crossed module N and any e ∈ Z3(;S1), that the equivariant twisted K-theory group K*e,(N) admits a ring structure. As an application, we prove that for a compact, connected and simply connected Lie group G, the equivariant twisted K-theory group K[c], G* (G) is endowed with a canonical ring structure Ki+d[c],G(G) Kj+d[c],G(G) Ki+j+d[c], G(G), where d=dim G and [c]∈ H2(G G;S1).

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