English

Endpoint eigenfunction bounds for the Hermite operator

Classical Analysis and ODEs 2024-01-01 v2 Analysis of PDEs

Abstract

We establish the optimal LpL^p, p=2(d+3)/(d+1),p=2(d+3)/(d+1), eigenfunction bound for the Hermite operator H=Δ+x2\mathcal H=-\Delta+|x|^2 on Rd\mathbb R^d. Let Πλ\Pi_\lambda denote the projection operator to the vector space spanned by the eigenfunctions of H\mathcal H with eigenvalue λ\lambda. The optimal L2L^2--LpL^p bounds on Πλ\Pi_\lambda, 2p2\le p\le \infty, have been known by the works of Karadzhov and Koch-Tataru except p=2(d+3)/(d+1)p=2(d+3)/(d+1). For d3d\ge 3, we prove the optimal bound for the missing endpoint case. Our result is built on a new phenomenon: improvement of the bound due to asymmetric localization near the sphere λSd1\sqrt\lambda \mathbb S^{d-1}.

Keywords

Cite

@article{arxiv.2205.03036,
  title  = {Endpoint eigenfunction bounds for the Hermite operator},
  author = {Eunhee Jeong and Sanghyuk Lee and Jaehyeon Ryu},
  journal= {arXiv preprint arXiv:2205.03036},
  year   = {2024}
}

Comments

Final version, to appear in JEMS. The paper is an extended revision of a part of the paper Hermite spectral projection operator (arXiv:2006.11762). The earlier paper will remain unpublished permanently

R2 v1 2026-06-24T11:08:58.646Z