English

Lower bounds for eigenfunction restrictions in lacunary regions

Analysis of PDEs 2023-03-01 v1

Abstract

Let (M,g)(M,g) be a compact, smooth Riemannian manifold and {uh}\{u_h\} be a sequence of L2L^2-normalized Laplace eigenfunctions that has a localized defect measure μ\mu in the sense that Msupp(πμ) M \setminus \text{supp}(\pi_* \mu) \neq \emptyset where π:TMM\pi:T^*M \to M is the canonical projection. Using Carleman estimates we prove that for any real-smooth closed hypersurface H(Msupp(πμ))H \subset (M\setminus \text{supp} (\pi_* \mu)) sufficiently close to supp(πμ), \text{supp}(\pi_* \mu), and for all δ>0,\delta >0, Huh2dσCδe[d(H,supp(πμ))+δ]/h \int_{H} |u_h|^2 d\sigma \geq C_{\delta}\, e^{- [\, d(H, \text{supp}(\pi_* \mu)) + \,\delta] /h} as h0+h \to 0^+. We also show that the result holds for eigenfunctions of Schr\"odinger operators and give applications to eigenfunctions on warped products and joint eigenfunctions of quantum completely integrable (QCI) systems.

Keywords

Cite

@article{arxiv.2207.05607,
  title  = {Lower bounds for eigenfunction restrictions in lacunary regions},
  author = {Yaiza Canzani and John A. Toth},
  journal= {arXiv preprint arXiv:2207.05607},
  year   = {2023}
}
R2 v1 2026-06-25T00:51:08.823Z