Optimal Design of Tubular Perfectly Conducting Objects in Electromagnetic Chirality
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Abstract
This work is about the shape optimization of long tubular objects in electromagnetic chirality (em-chirality).
Em-chirality is a property of individual scattering objects or metamaterials describing their qualitatively different response to electromagnetic waves of opposite polarization handedness.
The optimization is performed by a Newton-type iterative maximization of a regularized em-chirality measure with respect to the scatterer's shape.
In this context, the differentiability of the object-to-far field operator map is analyzed rigorously, thereby extending previously known results on the domain derivative to the far field operator setting.
Our optimal design algorithm is based on the electric field integral equation, which is employed both for the evaluation of scattered fields and for the computation of the domain derivative.
Our implementation is done via the boundary element method.
The numerical examples presented in this work yield strongly em-chiral scattering objects capable of exciting higher-order modes beyond the dipole regime with nonintuitive shapes that expand the known set of highly em-chiral scattering objects.