English

Semiclassical measures for higher dimensional quantum cat maps

Analysis of PDEs 2023-04-25 v2 Spectral Theory

Abstract

Consider a quantum cat map MM associated to a matrix ASp(2n,Z)A\in\mathop{\mathrm{Sp}}(2n,\mathbb Z), which is a common toy model in quantum chaos. We show that the mass of eigenfunctions of MM on any nonempty open set in the position-frequency space satisfies a lower bound which is uniform in the semiclassical limit, under two assumptions: (1) there is a unique simple eigenvalue of AA of largest absolute value and (2) the characteristic polynomial of AA is irreducible over the rationals. This is similar to previous work [arXiv:1705.05019], [arXiv:1906.08923] on negatively curved surfaces and [arXiv:2103.06633] on quantum cat maps with n=1n=1, but this paper gives the first results of this type which apply in any dimension. When condition (2) fails we provide a weaker version of the result and discuss relations to existing counterexamples. We also obtain corresponding statements regarding semiclassical measures and damped quantum cat maps.

Keywords

Cite

@article{arxiv.2108.10463,
  title  = {Semiclassical measures for higher dimensional quantum cat maps},
  author = {Semyon Dyatlov and Malo Jézéquel},
  journal= {arXiv preprint arXiv:2108.10463},
  year   = {2023}
}

Comments

63 pages, 4 figures. Various revisions following the referee comments. Electronic copy of final peer-reviewed manuscript accepted for publication in Annales Henri Poincar\'e

R2 v1 2026-06-24T05:21:55.249Z