A fast direct solver for elliptic problems with a divergence constraint

We present a fourth order numerical solution method for the singular Neumann boundary problem of Poisson equations. Such problems arise in the solution process of incompressible Navier-Stokes equations and in the time-harmonic wave propagation in the frequence space with the zero wavenumber. The equ

A wavelet variation of the "Frequency decomposition multigrid method, Part I" (FDMGM) of Hackbusch [Numer. Math. 56 (1989) 229-245] is presented. The perfect reconstruction property and the multiresolution structure of wavelets yield the robustness of the additive as well as of the multiplicative ve

A direct constraint technique, based on the hybrid-Trefftz finite element method, is first presented to solve elastic contact problems without friction. For efficiency, static condensation is employed to condense a large model down to a smaller one which involves nodes within the potential contact s

## Abstract We consider a second‐order differential operator __A__(x)=−__∑__∂~__i__~__a__~__ij__~(x)∂~__j__~+ __∑__∂~__j__~(__b__~__j__~(x)·)+__c__(x) on ℝ^__d__^, on a bounded domain __D__ with Dirichlet boundary conditions on ∂__D__, under mild assumptions on the coefficients of the diffusion ten