On diagonal actions of free group on the Cantor set

Abstract

We study diagonal actions :F2∂F2× K on the Cantor set which are given by a=∂a×α,b=∂b×β. Under some restrictions on α,β we compute K*(C(∂F2× K)rF2). As an application in the case of α is Denjoy homeomorphism of the Cantor set and β=id we will show that C(∂F2× K)rF2 is Kirchberg algebra with K*(C(∂F2× K)rF2)=(Z∞,Z∞). Also we will check that C*-crossed product by Denjoy homeomorphism on the Cantor set is C*-algebra generated by weighted shift, namely C(K) C*(Tx) where x∈ \1,2\Z is two-sided Fibonacci sequence.