Newton iterative shape optimization on the EFIE via BEM maximizes regularized em-chirality for tubular conductors, producing nonintuitive shapes that excite higher-order modes.
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3 Pith papers cite this work. Polarity classification is still indexing.
years
2026 3verdicts
UNVERDICTED 3representative citing papers
A new spectral truncation method for filtering 3D EFIE integral operators is introduced using the spherical Hankel transform representation of the Green's function, supported by semi-analytical and numerical evidence on operator spectra.
A preconditioning technique for the shifted Helmholtz operator stabilizes EFIE iterative solvers across multiple frequency and discretization regimes, enabling quasi-linear complexity.
citing papers explorer
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Optimal Design of Tubular Perfectly Conducting Objects in Electromagnetic Chirality
Newton iterative shape optimization on the EFIE via BEM maximizes regularized em-chirality for tubular conductors, producing nonintuitive shapes that excite higher-order modes.
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Spectral Filtering of 3D Integral Operators Using Modified Green's Functions
A new spectral truncation method for filtering 3D EFIE integral operators is introduced using the spherical Hankel transform representation of the Green's function, supported by semi-analytical and numerical evidence on operator spectra.
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High-Frequency Preconditioners for Electromagnetic Integral Equations Based on Helmholtz Regularizations
A preconditioning technique for the shifted Helmholtz operator stabilizes EFIE iterative solvers across multiple frequency and discretization regimes, enabling quasi-linear complexity.