A survey of Trefftz methods for the Helmholtz equation
نویسندگان
چکیده
Trefftz methods are finite element-type schemes whose test and trial functions are (locally) solutions of the targeted differential equation. They are particularly popular for time-harmonic wave problems, as their trial spaces contain oscillating basis functions and may achieve better approximation properties than classical piecewise-polynomial spaces. We review the construction and properties of several Trefftz variational formulations developed for the Helmholtz equation, including least squares, discontinuous Galerkin, ultra weak variational formulation, variational theory of complex rays and wave based methods. The most common discrete Trefftz spaces used for this equation employ generalised harmonic polynomials (circular and spherical waves), plane and evanescent waves, fundamental solutions and multipoles as basis functions; we describe theoretical and computational aspects of these spaces, focusing in particular on their approximation properties. One of the most promising, but not yet well developed, features of Trefftz methods is the use of adaptivity in the choice of the propagation directions for the basis functions. The main difficulties encountered in the implementation are the assembly and the ill-conditioning of linear systems, we briefly survey some strategies that have been proposed to cope with these problems. Ralf Hiptmair Seminar for Applied Mathematics, ETH Zürich, 8092 Zürich, Switzerland, e-mail: [email protected] Andrea Moiola Department of Mathematics and Statistics, University of Reading, Whiteknights PO Box 220, RG6 6AX, UK, e-mail: [email protected] Ilaria Perugia Faculty of Mathematics, University of Vienna, 1090 Vienna, Austria, and Department of Mathematics, University of Pavia, 27100 Pavia, Italy, e-mail: [email protected]
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