On the effective permittivity of finite inhomogeneous objects

TL;DR

This paper generalizes the S-parameter retrieval method to define the effective permittivity of finite inhomogeneous objects, revealing non-uniqueness, dependence on conditions, and ill-posedness in inverse scattering problems.

Contribution

It introduces a rigorous, generalized framework for effective permittivity in inhomogeneous objects, linking it to inverse scattering and revealing fundamental limitations.

Findings

Effective permittivity is non-unique and condition-dependent.

The inverse problem is often ill-posed or non-existent.

Negative permittivity values are within ill-posed parameter sets.

Abstract

A generalization of the S-parameter retrieval method for finite three-dimensional inhomogeneous objects under arbitrary illumination and observation conditions is presented. The effective permittivity of such objects may be rigorously defined as a solution of a nonlinear inverse scattering problem. In this respect the problems of S-parameter retrieval, effective medium theory, and even the derivation of the macroscopic electrodynamics itself, turn out to be all mathematically equivalent. We confirm analytically and observe numerically effects that were previously reported in the one-dimensional strongly inhomogeneous slabs: the non-uniqueness of the effective permittivity and its dependence on the illumination and observation conditions, and the geometry of the object. Moreover, we show that, although the S-parameter retrieval of the effective permittivity is scale-free at the level of problem statement, the exact solution of this problem either does not exist or is not unique. Using the results from the spectral analysis we describe the set of values of the effective permittivity for which the scattering problem is ill-posed. Unfortunately, real nonpositive values, important for negative refraction and invisibility, belong to this set. We illustrate our conclusions using a numerical reduced-order inverse scattering algorithm specifically designed for the effective permittivity problem.