Quantum unique ergodicity for parabolic maps
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Publication:5930043
DOI10.1007/PL00001661zbMath1172.37304arXivmath-ph/9901001WikidataQ126113522 ScholiaQ126113522MaRDI QIDQ5930043
Publication date: 10 April 2002
Published in: Geometric and Functional Analysis. GAFA (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math-ph/9901001
Semiclassical techniques, including WKB and Maslov methods applied to problems in quantum theory (81Q20) Ergodic theory (37A99)
Related Items (10)
Rank-uniform local law for Wigner matrices ⋮ Normal fluctuation in quantum ergodicity for Wigner matrices ⋮ Quantum variance and ergodicity for the baker's map ⋮ Superscars for arithmetic toral point scatterers ⋮ Eigenstate thermalization hypothesis for Wigner matrices ⋮ Quantum leaks ⋮ Quantisations of piecewise parabolic maps on the torus and their quantum limits ⋮ Multifractal eigenfunctions for a singular quantum billiard ⋮ Hecke theory and equidistribution for the quantization of linear maps of the torus ⋮ Fluctuations in local quantum unique ergodicity for generalized Wigner matrices
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