Inverse semigroup equivariant KK-theory and C*-extensions
Abstract
In this note we extend the classical result by G. G. Kasparov that the Kasparov groups KK1(A,B) can be identified with the extension groups Ext(A,B) to the inverse semigroup equivariant setting. More precisely, we show that KKG1(A,B) ExtG(A KG,B KG) for every countable, E-continuous inverse semigroup G. For locally compact second countable groups G this was proved by K. Thomsen, and technically this note presents an adaption of his proof.
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