We illustrate its performance in a number of solutions through experimentally derived convergence rates and comparisons with other techniques. The method does not depend on any kind of parameter tuning. We investigate the well-posedness of the variational problem and construct compatible meshfree function spaces able to describe solutions in any geometry, in two and three dimensions. We propose a mixed formulation whose unknowns are the electric field vector and a Lagrange multiplier.
The problem is described by the vector wave equation with a divergence-free constraint. We propose a completely meshfree procedure aimed at the time-harmonic analysis of electromagnetic wave scattering from conducting targets. We propose a meshfree procedure for the time-harmonic analysis of electromagnetic wave scattering from conducting targets.We provide a novel formulation and also a totally meshfree discretization scheme.The problem is described by the vector wave equation with a divergence-free constraint.We propose a mixed formulation whose unknowns are the electric field vector and a Lagrange multiplier.The well-posedness of the variational problem is investigated, and compatible meshfree function spaces are given.
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