Uniqueness result for Almost Periodic Distributions depending on time and space and an application to the unique continuation for the wave equation

Abstract

Let ⊂ RN, N=1,2,3, be an open bounded and connected set with continuous piecewise C∞ boundary. Here we deal with almost periodic distributions of the form u(t,x)=Σn=0+∞ cn Sn(x) ei λn t where (cn)n∈ N⊂ C belong to the space of slowing growing sequences s, and (λn2)n∈N⊂ R and (Sn)n∈N⊂ H01() are respectively the eigenvalues and eigenvectors of the Laplacian. Given ω⊂, we prove that there exists Tmax(,ω)>0 depending only on and ω such that if T>Tmax(,ω) and u|ω× ]-T,T[=0, then u 0. Using this result we prove a unique continuation property for the wave equation.