中文

Quantum ergodicity for graphs related to interval maps

数学物理 2011-10-19 v1 math.MP

摘要

We prove quantum ergodicity for a family of graphs that are obtained from ergodic one-dimensional maps of an interval using a procedure introduced by Pakonski et al (J. Phys. A, v. 34, 9303-9317 (2001)). As observables we take the L^2 functions on the interval. The proof is based on the periodic orbit expansion of a majorant of the quantum variance. Specifically, given a one-dimensional, Lebesgue-measure-preserving map of an interval, we consider an increasingly refined sequence of partitions of the interval. To this sequence we associate a sequence of graphs, whose directed edges correspond to elements of the partitions and on which the classical dynamics approximates the Perron-Frobenius operator corresponding to the map. We show that, except possibly for subsequences of density 0, the eigenstates of the quantum graphs equidistribute in the limit of large graphs. For a smaller class of observables we also show that the Egorov property, a correspondence between classical and quantum evolution in the semiclassical limit, holds for the quantum graphs in question.

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引用

@article{arxiv.math-ph/0607008,
  title  = {Quantum ergodicity for graphs related to interval maps},
  author = {G. Berkolaiko and J. P. Keating and U. Smilansky},
  journal= {arXiv preprint arXiv:math-ph/0607008},
  year   = {2011}
}

备注

20 pages, 1 figure