English

A generalized Calderon Formula for open-arc diffraction problems: theoretical considerations

Analysis of PDEs 2013-06-07 v2

Abstract

We deal with the general problem of scattering by open-arcs in two-dimensional space. We show that this problem can be solved by means of certain second-kind integral equations of the form N~S~[φ]=f\tilde{N} \tilde{S}[\varphi] = f, where N~\tilde{N} and S~\tilde{S} are first-kind integral operators whose composition gives rise to a generalized Calder\'on formula of the form N~S~=J~0τ+K~\tilde{N} \tilde{S} = \tilde{J}_0^\tau + \tilde{K} in a {\em weighted, periodized} Sobolev space. The N~S~\tilde{N} \tilde{S} formulation provides, for the first time, a second-kind integral equation for the open-arc scattering problem with Neumann boundary conditions. Numerical experiments show that, for both the Dirichlet and Neumann boundary conditions, our second-kind integral equations have spectra that are bounded away from zero and infinity as kk\to \infty; to the authors' knowledge these are the first integral equations for these problems that possess this desirable property. Our proofs rely on three main elements: 1) Algebraic manipulations enabled by the presence of integral weights; 2) Use of the classical result of continuity of the Ces\`aro operator; and 3) Explicit characterization of the point spectrum of J~0τ\tilde{J}^\tau_0, which, interestingly, can be decomposed into the union of a countable set and an open set, both tightly clustered around -1/4. As shown in a separate contribution, the new approach can be used to construct simple spectrally-accurate numerical solvers and, when used in conjunction with Krylov-subspace solvers such as GMRES, gives rise to dramatic reductions of Krylov-subspace iteration numbers vs. those required by other approaches.

Keywords

Cite

@article{arxiv.1204.3699,
  title  = {A generalized Calderon Formula for open-arc diffraction problems: theoretical considerations},
  author = {Stephane K. Lintner and Oscar P. Bruno},
  journal= {arXiv preprint arXiv:1204.3699},
  year   = {2013}
}

Comments

29 pages

R2 v1 2026-06-21T20:50:32.157Z