Wave scattering by a transversal defect in a discrete waveguide

TL;DR

This paper provides an exact analytical solution for wave scattering by a transversal defect in a discrete waveguide, achieving high accuracy and validating results against numerical methods, thus advancing discrete waveguide analysis.

Contribution

It introduces an exact analytical solution for wave scattering in a discrete waveguide with a transversal defect, using pole removal, and compares it with numerical results.

Findings

High-precision reflection and transmission coefficients computed

Full reflection and zero transmission near cut-off frequency

Validation against Boundary Algebraic Equations method

Abstract

We study wave scattering by a finite transversal strip in a discrete square-lattice waveguide with Dirichlet boundary conditions imposed on the strip and the waveguide walls. The setting is motivated as a discrete analogue of the classical continuous waveguide problem with a screen. The corresponding Wiener--Hopf formulation leads to an equation with a $4 \times 4$ matrix kernel, which reduces to a $2 \times 2$ matrix kernel under some symmetry assumptions. The factorisation prospects of this kernel are discussed, but this route is not followed. Instead, an exact analytical solution is obtained using the pole removal technique. This contrasts with the continuous case, where only approximate solutions are currently available. The reflection and transmission coefficients resulting from an incident duct mode are computed with an accuracy up to $10^{-13}$, showing consistency with theoretical predictions from continuous waveguide theory. In particular, full reflection and zero transmission are recovered as the frequency approaches the cut-off value for the incident mode. Finally, the solution is validated against a numerical computation of the diffraction problem via the Boundary Algebraic Equations method with a tailored lattice Green's function.