Leakage detection, collision relation, and self-adjoint cancellation in multi-velocity systems

Abstract

Let WT map Dirichlet data f to time T state uf(T, ·), we study the K-normal operator CTK:= (WT)*KWT where (WT)* is the standard L2(dx) adjoint. We prove that it is a Fourier Integral Operator away from the glancing directions with canonical relation involving collision data between pairs of velocities. However, if the operator is M-self-adjoint, then the canonical relation for CTM loses the collision data and reduces to scattering relation for each individual metric. Thus, when system satisfies certain coupling requirement, we demonstrate off-polarization leakage detection and introduce a new collision rigidity problem. Combine these two parts, we prove an inverse problem of velocity recovery from CTK for multi-velocity wave models and variable coefficient isotropic elasticity system.