Maximal abelian subalgebras and projections in two Banach algebras associated with a topological dynamical system

Abstract

If =(X,σ) is a topological dynamical system, where X is a compact Hausdorff space and σ is a homeomorphism of X, then a crossed product Banach *-algebra 1() is naturally associated with these data. If X consists of one point, then 1() is the group algebra of the integers. The commutant C(X)'1 of C(X) in 1() is known to be a maximal abelian subalgebra which has non-zero intersection with each non-zero closed ideal, and the same holds for the commutant C(X)'* of C(X) in C*(), the enveloping C*-algebra of 1(). This intersection property has proven to be a valuable tool in investigating these algebras. Motivated by this pivotal role, we study C(X)'1 and C(X)'* in detail in the present paper. The maximal ideal space of C(X)'1 is described explicitly, and is seen to coincide with its pure state space and to be a topological quotient of X×T. We show that C(X)'1 is hermitian and semisimple, and that its enveloping C*-algebra is C(X)'*. Furthermore, we establish necessary and sufficient conditions for projections onto C(X)'1 and C(X)'* to exist, and give explicit formulas for such projections, which we show to be unique. In the appendix, topological results for the periodic points of a homeomorphism of a locally compact Hausdorff space are given.