Bound and Optimal Design of Dallenbach Absorber Under Finite-Bandwidth Multiple-Angle Illumination

Dallenbach absorbers are lossy substances attached to a perfect electric conductor sheet. For such a configuration Rozanov derived a sum rule that relates the absorber's efficacy with its thickness and frequency-band of operation. Rozanov's derivation is valid only for layer impinged by a normally incident plane wave. Later, this relation was extended for oblique incidence considering both transverse electric and transverse magnetic polarizations. Here, we follow the same approach and present a sum rule that is valid for multiple and possibly a spectrum of oblique incident waves which are arbitrarily weighted. We recast the design of the Dallenbach absorber as an optimization problem, where optimization is performed over its electromagnetic properties. The optimization problem is applicable for practical implementations where finite spectral bandwidth is considered, as well as for theoretical aspects such as determining the tightness of the sum rule over an infinite bandwidth. We provide a numerical example for a practical case where we perform an optimization procedure for a given weight function and finite bandwidth. Additionally, we demonstrate the effect of the weight function on the optimization results.