中文

New topics in ergodic theory

算子代数 2007-05-23 v1

摘要

The entangled ergodic theorem concerns the study of the convergence in the strong, or merely weak operator topology, of the multiple Cesaro mean 1Nkn1,...,nk=0N1Un\a(1)A1Un\a(2)...Un\a(2k1)A2k1Un\a(2k),\frac{1}{N^{k}}\sum_{n_{1},...,n_{k}=0}^{N-1} U^{n_{\a(1)}}A_{1}U^{n_{\a(2)}}... U^{n_{\a(2k-1)}}A_{2k-1}U^{n_{\a(2k)}} , where UU is a unitary operator acting on the Hilbert space HH, \a:{1,...,m}{1,...,k}\a:\{1,..., m\}\mapsto\{1,..., k\} is a partition of the set made of mm elements in kk parts, and finally A1,...,A2k1A_{1},...,A_{2k-1} are bounded operators acting on HH. 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)(\mathfrak A,\alpha) be a CC^{*}--dynamical system, where A=K(H)\mathfrak A=K(H), and α=ad(U)\alpha=ad(U) is an automorphism implemented by the unitary UU. We show that limN+1Nn=0N1αn=E,\lim_{N\to+\infty}\frac{1}{N}\sum_{n=0}^{N-1}\alpha^{n}=E , pointwise in the weak topology of \K(H)\K(H). Here, EE is a conditional expectation projecting onto the CC^{*}--subalgebra (zσpp(U)EzB(H)Ez)K(H).\bigg(\bigoplus_{z\in\sigma_{\mathop{\rm pp}}(U)} E_{z}B(H)E_{z}\bigg)\bigcap K(H) . If in addition UU is weakly mixing with ΩH\Omega\in H the unique up to a phase, invariant vector under UU and ω=<Ω,Ω>\omega=<\cdot \Omega,\Omega>, we have the following recurrence result. If AK(H)A\in K(H) fulfils ω(A)>0\omega(A)>0, and 0<m1<m2<...<ml0<m_{1}<m_{2}<...<m_{l} are natural numbers kept fixed, then there exists an N0N_{0} such that 1Nn=0N1ω(Aαnm1(A)αnm2(A)...αnml(A))>0\frac{1}{N}\sum_{n=0}^{N-1}\omega(A\alpha^{nm_{1}}(A)\alpha^{nm_{2}}(A)... \alpha^{nm_{l}}(A))>0 for each N>N0N>N_{0}.

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引用

@article{arxiv.math/0702103,
  title  = {New topics in ergodic theory},
  author = {Francesco Fidaleo},
  journal= {arXiv preprint arXiv:math/0702103},
  year   = {2007}
}

备注

18 pages