A discontinuous least squares finite element method for the Helmholtz equation.

We propose a discontinuous least squares finite element method for solving the Helmholtz equation. The method is based on the L2$$ {L}^2 $$ norm least squares functional with the weak imposition of the continuity across the interior faces as well as the boundary conditions. We minimize the functional over the discontinuous polynomial spaces to seek numerical solutions. The wavenumber explicit error estimates to our method are established. The optimal convergence rate in the energy norm with respect to a fixed wavenumber is attained. The least squares functional can naturally serve as a posteriori estimator in the h‐adaptive procedure. It is convenient to implement the code due to the usage of discontinuous elements. Numerical results in two and three dimensions are presented to verify the error estimates. [ABSTRACT FROM AUTHOR]