An inequality regarding non-radiative linear waves via a geometric method

Abstract

In this work we consider the operator \[ (T G) (x)= ∫S2 G(x· ω, ω) dω, x∈ R3, \; G∈ L2(R× S2). \] This is the adjoint operator of the Radon transform. We manage to give an optimal L6 decay estimate of T G near the infinity by a geometric method, if the function G is compactly supported. As an application we give decay estimate of non-radiative solutions to the 3D linear wave equation in the exterior region \(x,t)∈ R3 × R: |x|>R+|t|\. This kind of decay estimate is useful in the channel of energy method for wave equations