Matrix stability and Morita invariance
Abstract
Let G be a group. We prove that matrix stability for either G-algebras or G-graded algebras guarantees Morita invariance. As a consequence, bivariant algebraic K-theory (either G-equivariant or G-graded) is Morita invariant. In particular, we show that if G is a finite group acting freely on a finite simplicial set X, then X G and X/G are kk-equivalent. Here, Y denotes the -algebra of piecewise polynomial functions on Y with coefficients in the ground ring .
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