English

Strichartz estimates for Dirichlet-wave equations in two dimensions with applications

Analysis of PDEs 2015-03-17 v2

Abstract

We establish the Strauss conjecture for nontrapping obstacles when the spatial dimension nn is two. As pointed out in \cite{HMSSZ} this case is more subtle than n=3n=3 or 4 due to the fact that the arguments of the first two authors \cite{SmSo00}, Burq \cite{B} and Metcalfe \cite{M} showing that local Strichartz estimates for obstactles imply global ones require that the Sobolev index, γ\gamma, equal 1/2 when n=2n=2. We overcome this difficulty by interpolating between energy estimates (γ=0\gamma =0) and ones for γ=12\gamma=\frac12 that are generalizations of Minkowski space estimates of Fang and the third author \cite{FaWa2}, \cite{FaWa}, the second author \cite{So08} and Sterbenz \cite{St05}.

Keywords

Cite

@article{arxiv.1012.3183,
  title  = {Strichartz estimates for Dirichlet-wave equations in two dimensions with applications},
  author = {Hart F. Smith and Christopher D. Sogge and Chengbo Wang},
  journal= {arXiv preprint arXiv:1012.3183},
  year   = {2015}
}

Comments

Final version, to appear in the Transactions of the AMS. 20 pages, 2 figures

R2 v1 2026-06-21T16:58:46.203Z