Concentration and confinement of eigenfunctions in a bounded open set (version 2)

Abstract

Consider the Dirichlet-Laplacian in := (0,L)× (0,H) and choose another open set ω⊂ . The estimate 0<Cω≤ Rω(u):= u2L2(ω) u2L2()≤ vol(ω)vol(ω), for all the eigenfunctions, is well known. This is no longer true for an inhomogeneous elliptic selfadjoint operator A. In this work we create a partition among the set of eigenfunctions: ∀ ω, the eigenfunctions satisfy Romega>Cω>0,∃ ω, ω=, such that ∈f Rω(u)=0,and we wish to characterize these two sets. For two patterns we give a sufficient condition, sometimes necessary. As our operator corresponds to a layered media we can give another representation of its spectrum: i.e. a subset of points of R× R that leads to the suggested partition and others connected results: micro local interpretation, default measures,... Section 4.1 of the previous version was not correct, now it is corrected, many proofs are simplified and a new general result is added.