Considerations on double exponential-based cubatures for the computation of weakly singular Galerkin inner products

Highly accurate and efficient cubatures based on the double exponential quadrature rules are presented for the computation of weakly singular integrals arising in Galerkin mixed potential integral equation formulations. Due to their unique ability to handle non-smooth kernels, the proposed integration schemes can safely replace (in a "plug-n-play" sense) the traditional Gauss-Legendre rules in the existing singularity cancellation and singularity subtraction methods. Numerical examples using RWG basis functions confirm the excellent performance of the proposed method.

Considerations on double exponential-based cubatures for the computation of weakly singular Galerkin inner products

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The time-domain Cartesian multipole expansion of electromagnetic fields

From low-rank retractions to dynamical low-rank approximation and back

Pore size estimation in axon-mimicking microfibers with diffusion-relaxation MRI

The time-domain Cartesian multipole expansion of electromagnetic fields

From low-rank retractions to dynamical low-rank approximation and back

Pore size estimation in axon-mimicking microfibers with diffusion-relaxation MRI