New topics in ergodic theory
Abstract
The entangled ergodic theorem concerns the study of the convergence in the strong, or merely weak operator topology, of the multiple Cesaro mean 1NkΣn1,...,nk=0N-1 Un(1)A1Un(2)... Un(2k-1)A2k-1Un(2k) , where U is a unitary operator acting on the Hilbert space H, :\1,..., m\\1,..., k\ is a partition of the set made of m elements in k parts, and finally A1,...,A2k-1 are bounded operators acting on H. While reviewing recent results about the entangled ergodic theorem, we provide some natural applications to dynamical systems based on compact operators. Namely, let ( A,α) be a C*--dynamical system, where A=K(H), and α=ad(U) is an automorphism implemented by the unitary U. We show that N+∞1NΣn=0N-1αn=E , pointwise in the weak topology of (H). Here, E is a conditional expectation projecting onto the C*--subalgebra (z∈σ pp(U) EzB(H)Ez) K(H) . If in addition U is weakly mixing with ∈ H the unique up to a phase, invariant vector under U and ω=<· ,>, we have the following recurrence result. If A∈ K(H) fulfils ω(A)>0, and 0<m1<m2<...<ml are natural numbers kept fixed, then there exists an N0 such that 1NΣn=0N-1ω(Aαnm1(A)αnm2(A)... αnml(A))>0 for each N>N0.
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