Lefschetz Numbers and Geometry of Operators in W*-modules
Abstract
The main goal of the present paper is to generalize the results of~TroLNM,TroBoch in the following way: To be able to define K0(A)-valued Lefschetz numbers of the first type of an endomorphism V on a C*-elliptic complex one usually assumes that V=Tg for some representation Tg of a compact group G on the C*-elliptic complex. We try to refuse this restriction in the present paper. The price to pay for this is twofold: (i) We have to define Lefschetz numbers valued in some larger group as K0(A). (ii) We have to deal with W*-algebras instead of general unital C*-algebras. To obtain these results we have got a number of by-product facts on the theory of Hilbert W*- and C*-modules and on bounded module operators on them which are of independent interest.
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