Analytical prediction for the optical matrix

Abstract

Contrary to praxis, we provide an analytical expression, for a physical locally periodic structure, of the average S of the scattering matrix, called optical S matrix in the nuclear physics jargon, and fundamentally present in all scattering processes. This is done with the help of a strictly analogous nonlinear dynamical mapping where iteration time is the number N of scatterers. The ergodic property of chaotic attractors implies the existence and analyticity of S. We find that the optical S matrix depends only on the transport properties of a single cell, and that the Poisson kernel is the distribution of the scattering matrix SN in the large size limit N→ ∞. The theoretical distribution shows perfect agreement with numerical results for a chain of delta potentials. A consequence of our findings is the a priori knowledge of S without resort to experimental data.