Reproducing kernel for elastic Herglotz functions

Abstract

We study the elastic Herglotz wave functions, which are entire solutions of the spectral Navier equation appearing in the linearized elasticity theory with L2-far-field patterns. We characterize in three-dimensions the set of these functions W, as a close subspace of a Hilbert space H of vector valued functions such that they and their spherical gradients belong to a certain weighted L2 space. This allows us to prove that W is a reproducing kernel Hilbert space and to calculate the reproducing kernel. Finally, we outline the proof for the two-dimensional case and give the corresponding reproducing kernel.