On the location of maximal of solutions of Schr\"odinger's equation

Abstract

We prove an inequality with applications to solutions of the Schr\"odinger equation. There is a universal constant c>0, such that if ⊂ R2 is simply connected, u: → R vanishes on the boundary ∂ , and |u| assumes a maximum in x0 ∈ , then ∈fy ∈ ∂ \| x0 - y\| ≥ c \| uu \|-1/2L∞(). It was conjectured by P\'olya \& Szego (and proven, independently, by Makai and Hayman) that a membrane vibrating at frequency λ contains a disk of size λ-1/2. Our inequality implies a refined result: the point on the membrane that achieves the maximal amplitude is at distance λ-1/2 from the boundary. We also give an extension to higher dimensions (generalizing results of Lieb and Georgiev \& Mukherjee): if u solves - u = Vu on ⊂ Rn with Dirichlet boundary conditions, then the ball B with radius \|V\|L∞()-1/2 centered at the point in which |u| assumes a maximum is almost fully contained in in the sense that |B | ≥ 0.99 |B|.