On the validity of the Landau-Lifshitz method of deriving a higher order gravitational potential

## Abstract We consider the problem of minimizing 0<__p__<1, __h__∈ℝ, __σ__>0, among functions __u__:ℝ^__d__^⊃Ω→ℝ^__d__^, __u__~∣∂Ω~=0, and measurable characteristic functions χ:Ω→ℝ. Here ƒ^+^~__h__~, ƒ^−^, denote quadratic potentials defined on the space of all symmetric __d__×__d__ matrices, __

In this study we propose a novel method to parallelize high-order compact numerical algorithms for the solution of three-dimensional PDEs in a space-time domain. For such a numerical integration most of the computer time is spent in computation of spatial derivatives at each stage of the Runge-Kutta

## Abstract A higher‐order discontinuous enrichment method (DEM) with Lagrange multipliers is proposed for the efficient finite element solution on unstructured meshes of the advection–diffusion equation in the high Péclet number regime. Following the basic DEM methodology, the usual Galerkin polyn