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Quantum Flux and Quantum Ergodicity for Cross Sections

Published 2 Apr 2024 in math.AP, math-ph, and math.MP | (2404.02296v1)

Abstract: For sequences of quantum ergodic eigenfunctions, we define the quantum flux norm associated to a codimension $1$ submanifold $\Sigma$ of a non-degenerate energy surface. We prove restrictions of eigenfunctions to $\Sigma$, realized using the quantum flux norm, are quantum ergodic. We compare this result to known results from \cite{CTZ} in the case of Euclidean domains and hyperfurfaces. As a further application, we consider complexified analytic eigenfunctions and prove a second microlocal analogue of \cite{CTZ} in that context.

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Authors (2)

  1. Hans Christianson 
  2. John Toth 

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