Noncommutative functional calculate and its application

Abstract

In this paper we construct an unitary operator Fxx* such that (Fxx*)2=identity and Fix(Fxx*)≠. We get the unitary equivalent representations Fxx*(Mz(z)-a) on L2(σ(|T+a|),μ|T+a|) for any given T∈B(H), where (z)∈L∞(σ(|T+a|),μ|T+a|), a∈(T), Fxx*(f(xx*))=f(x*x), B(H) is the set of all bounded linear operator on complex separable Hilbert space H. Also, we get that if z(z)∈ Fix(Fxx*), then T has a nontrivial invariant subspace space on H which has dimension >1. Moreover, we define the Lebesgue class BLeb(H)⊂B(H) and get that if T is a Lebesgue operator, then T is Li-Yorke chaotic if and only if T*-1 is.