L^{2}-restriction bounds for eigenfunctions along curves in the quantum completely integrable case

John A. Toth

doi:10.1007/s00220-009-0747-y

L^{2}-restriction bounds for eigenfunctions along curves in the quantum completely integrable case

Analysis of PDEs 2009-11-13 v2

Authors: John A. Toth

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Abstract

We show that for a quantum completely integrable system in two dimensions,the $L^{2}$ -normalized joint eigenfunctions of the commuting semiclassical pseudodifferential operators satisfy restriction bounds ofthe form $\int_{\gamma} |\phi_{j}^{\hbar}|^2 ds = {\mathcal O}(|\log \hbar|)$ for generic curves $\gamma$ on the surface. We also prove that the maximal restriction bounds of Burq-Gerard-Tzvetkov are always attained for certain exceptional subsequences of eigenfunctions.

Keywords

laplacian eigenfunctions semiclassical analysis function spaces and inequalities

Cite

@article{arxiv.0803.0978,
  title  = {L^{2}-restriction bounds for eigenfunctions along curves in the quantum completely integrable case},
  author = {John A. Toth},
  journal= {arXiv preprint arXiv:0803.0978},
  year   = {2009}
}

Comments

Correct some typos and added some more detail in section 2

L^{2}-restriction bounds for eigenfunctions along curves in the quantum completely integrable case

Abstract

Keywords

Cite

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