Restriction estimates in a conical singular space: wave equation
Analysis of PDEs
2020-07-13 v1
Abstract
We study the restriction estimates in a class of conical singular space with the metric , where the cross section is a compact -dimensional closed Riemannian manifold . Let be the Friedrich extension positive Laplacian on , and consider the operator with , where is a real function such that the operator is positive. In the present paper, we prove a type of modified restriction estimates for the solutions of wave equation associated with . The smallest positive eigenvalue of the operator plays an important role in the result. As an application, for independent of interests, we prove local energy estimates and Keel-Smith-Sogge estimates for the wave equation in this setting.
Cite
@article{arxiv.2007.05161,
title = {Restriction estimates in a conical singular space: wave equation},
author = {Xiaofen Gao and Junyong Zhang and Jiqiang Zheng},
journal= {arXiv preprint arXiv:2007.05161},
year = {2020}
}
Comments
Comments are welcome. 25 Pages