Eigenvalues, K-theory and Minimal Flows
Abstract
Let (Y,T) be a minimal suspension flow built over a dynamical system (X,S) and with (strictly positive, continuous) ceiling function f X. We show that the eigenvalues of (Y,T) are contained in the range of a trace on the K0-group of (X,S). Moreover, a trace gives an order isomorphism of a subgroup of K0(C(X)SZ) with the group of eigenvalues of (Y,S). Using this result, we relate the values of t for which the time-t map on minimal suspension flow is minimal, with the K-theory of the base of this suspension.
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