A review chapter presenting the Quantum Ergodicity theorem, its proof for manifolds with boundary, and progress on the Quantum Unique Ergodicity conjecture for Anosov systems via entropy constraints on semiclassical measures.
Small scale quantum ergodicity in cat maps. I
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abstract
In this series, we investigate quantum ergodicity at small scales for linear hyperbolic maps of the torus ("cat maps"). In Part I of the series, we prove quantum ergodicity at various scales. Let $N=1/h$, in which $h$ is the Planck constant. First, for all integers $N\in\mathbb{N}$, we show quantum ergodicity at logarithmical scales $|\log h|^{-\alpha}$ for some $\alpha>0$. Second, we show quantum ergodicity at polynomial scales $h^\alpha$ for some $\alpha>0$, in two special cases: $N\in S(\mathbb{N})$ of a full density subset $S(\mathbb{N})$ of integers and Hecke eigenbasis for all integers.
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Quantum ergodicity and semiclassical measures: mathematical results
A review chapter presenting the Quantum Ergodicity theorem, its proof for manifolds with boundary, and progress on the Quantum Unique Ergodicity conjecture for Anosov systems via entropy constraints on semiclassical measures.