English

Sharp microlocal Kakeya--Nikodym estimates for eigenfunctions with applications

Classical Analysis and ODEs 2026-03-26 v4 Analysis of PDEs Spectral Theory

Abstract

We extend the microlocal Kakeya--Nikodym bounds for eigenfunctions of Blair--Sogge to a larger range of exponents, which is optimal in all dimensions n3n\ge3 on general manifolds. On manifolds of constant sectional curvature, we introduce a new anisotropic variant of the microlocal Kakeya--Nikodym norm that further enlarges the admissible pp-range. As a corollary, by combining our results with a recent theorem of Hou, we obtain improved LpL^p bounds for Hecke--Maass forms on compact hyperbolic 33-manifolds. In particular, our method applies to general H\"ormander operators, and we characterize the LqLpL^q \to L^p boundedness of H\"ormander operators with positive-definite phase in all dimensions n3n\ge3, thereby fully resolving a question going back to H\"ormander. Further applications include improved LqLpL^q \to L^p Fourier extension bounds, and improved bounds related to the Bochner--Riesz conjecture in R3\mathbb R^3.

Keywords

Cite

@article{arxiv.2509.01116,
  title  = {Sharp microlocal Kakeya--Nikodym estimates for eigenfunctions with applications},
  author = {Chuanwei Gao and Shukun Wu and Yakun Xi},
  journal= {arXiv preprint arXiv:2509.01116},
  year   = {2026}
}

Comments

36 pages. Added new sharpness examples, which show that our $(q,p)$ bounds for H\"ormander operators with positive-definite phase, as well as the corresponding microlocal Kakeya--Nikodym estimates, are sharp in all dimensions. Similar examples also show that interpolation between the Tomas--Stein and Bourgain--Guth bounds yields the complete picture in the absence of the positivity assumption

R2 v1 2026-07-01T05:14:37.756Z