On local non-zero constraints in PDE with analytic coefficients

Abstract

We consider the Helmholtz equation with real analytic coefficients on a bounded domain ⊂Rd. We take d+1 prescribed boundary conditions fi and frequencies ω in a fixed interval [a,b]. We consider a constraint on the solutions uωi of the form ζ(uω1,…,uωd+1,∇ uω1,…,∇ uωd+1)≠0, where ζ is analytic, which is satisfied in when ω=0. We show that for any and almost any d+1 frequencies ωk in [a,b], there exist d+1 subdomains k such that ⊂kk and ζ(uωk1,…,uωkd+1,∇ uωk1,…,∇ uωkd+1)≠0 in k. This question comes from hybrid imaging inverse problems. The method used is not specific to the Helmholtz model and can be applied to other frequency dependent problems.