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On the Coupling of the Curved Virtual Element Method with the One-Equation Boundary Element Method for 2D Exterior Helmholtz Problems

Luca Desiderio, Silvia Falletta, Matteo Ferrari, L. Scuderi

2022SIAM Journal on Numerical Analysis18 citationsDOI

Abstract

We consider the Helmholtz equation with a nonconstant coefficient, defined in unbounded domains external to 2D bounded ones, endowed with a Dirichlet condition on the boundary and the Sommerfeld radiation condition at infinity. To solve it, we reduce the infinite region, in which the solution is defined, to a bounded computational one, delimited by a curved smooth artificial boundary, and we impose on this latter a nonreflecting condition of boundary integral type. Then, we apply the curved virtual element method in the finite computational domain, combined with the one-equation boundary element method on the artificial boundary. We present the theoretical analysis of the proposed approach, and we provide an optimal convergence error estimate in the energy norm. The numerical tests confirm the theoretical results and show the effectiveness of the new proposed approach.

Topics & Concepts

MathematicsHelmholtz equationMathematical analysisBoundary element methodRobin boundary conditionFinite element methodMixed boundary conditionDirichlet boundary conditionBoundary knot methodBoundary value problemMethod of fundamental solutionsBoundary (topology)Singular boundary methodPoincaré–Steklov operatorBounded functionDirichlet problemNeumann boundary conditionHelmholtz free energyPhysicsThermodynamicsQuantum mechanicsAdvanced Numerical Methods in Computational MathematicsElectromagnetic Simulation and Numerical MethodsNumerical methods in engineering
On the Coupling of the Curved Virtual Element Method with the One-Equation Boundary Element Method for 2D Exterior Helmholtz Problems | Litcius