A generalized higher order kernel energy approximation method

A generalized Newton method is proposed in conjunction with a higher-order Lagrangian finite element discretization of bodies undergoing finite elastic deformations. The method is based on a gradient-like modification of the Newton method, designed to suppress the sensitivity of higher-order element

A higher order time differencing method for the spatially nonhomogeneous Boltzmann equation is derived from the integral form of the equation along its characteristic line. Similar to the splitting method, which solves the collisionless equation in the convection step and the spatially homogeneous B

## Abstract A 2D higher‐order alternating‐direction‐implicit (ADI) finite‐difference time‐domain method based on a compact scheme is presented in this paper. This compact ADI method improves the efficiency of computation by reducing the bandwidth of the matrix to be inversed from seven to five for

A reproducing kernel particle method with built-in multiresolution features in a very attractive meshfree method for numerical solution of partial di!erential equations. The design and implementation of a Galerkin-based reproducing kernel particle method, however, faces several challenges such as th

The implementation of the multigrid method into the SIMPLE algorithm presents interesting aspects concerning the mass fluxes conservation on coarser grids, the k -m turbulence model and the higher-order discretization schemes. Higher-order discretization schemes for the convection terms are increasi