Divided difference operators in equivariant KK-theory
Abstract
Let G be a compact connected Lie group with a maximal torus T. Let A, B be G-C-algebras. We define certain divided difference operators on Kasparov's T-equivariant KK-group KKT(A,B) and show that KKG(A,B) is a direct summand of KKT(A,B). More precisely, a T-equivariant KK-class is G-equivariant if and only if it is annihilated by an ideal of divided difference operators. This result is a generalization of work done by Atiyah, Harada, Landweber and Sjamaar.
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