Semiclassical Measures for Higher-Dimensional Quantum Cat Maps

• dc.contributor.author: Dyatlov, Semyon
• dc.contributor.author: Jézéquel, Malo
• dc.date.issued: 2023-04-13
• dc.identifier.uri: https://hdl.handle.net/1721.1/150496
• dc.description.abstract: Abstract Consider a quantum cat map M associated with a matrix $$A\in {{\,\textrm{Sp}\,}}(2n,{\mathbb {Z}})$$ A ∈ Sp ( 2 n , Z ) , which is a common toy model in quantum chaos. We show that the mass of eigenfunctions of M 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 A of largest absolute value and (2) the characteristic polynomial of A is irreducible over the rationals. This is similar to previous work (Dyatlov and Jin in Acta Math 220(2):297–339, 2018; Dyatlov et al. in J Am Math Soc 35(2):361–465, 2022) on negatively curved surfaces and (Schwartz in The full delocalization of eigenstates for the quantized cat map, 2021) on quantum cat maps with $$n=1$$ n = 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.
• dc.publisher: Springer International Publishing
• dc.relation.isversionof: https://doi.org/10.1007/s00023-023-01309-x
• dc.source: Springer International Publishing
• dc.type: Article
• dc.identifier.citation: Dyatlov, Semyon and Jézéquel, Malo. 2023. "Semiclassical Measures for Higher-Dimensional Quantum Cat Maps."
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.identifier.mitlicense: PUBLISHER_CC
• dc.eprint.version: Final published version
• dc.language.rfc3066: en