A pollution-free ultra-weak FOSLS discretization of the Helmholtz equation

Abstract

We consider an ultra-weak first order system discretization of the Helmholtz equation. When employing the optimal test norm, the `ideal' method yields the best approximation to the pair of the Helmholtz solution and its scaled gradient w.r.t.~the norm on L2()× L2()d from the selected finite element trial space. On convex polygons, the `practical', implementable method is shown to be pollution-free essentially whenever the order p of the finite element test space grows proportionally with ( ,p2), with p being the order at trial side. Numerical results also on other domains show a much better accuracy than for the Galerkin method.