Stability and error analysis on partially implicit schemes

The concept of Incremental Unknowns leads to the introduction of large classes of new numerical schemes for which the large scale component I ' for the unknown, and its small scale component(s) Z are treated differently, leading to an improved condition number for elliptic problem and to an improved

Two algorithms are described [Ferris D. H. (fixed time-step method) and Gupta and Kumar (variable timestep method)] that solve a mathematical model for the study of the one-dimensional moving boundary problem with implicit boundary conditions. Landau's transformation is used, in order to work with a

This paper discusses implementation strategies for second-order ®nite dierence discretizations of advection. Purely explicit and implicit methods both have disadvantages, and we consider semi-implicit schemes in which the ¯ux is split into a primary implicit part and a secondary explicit correction.

A novel framework for solving variational problems and partial differential equations for scalar and vector-valued data defined on surfaces is introduced in this paper. The key idea is to implicitly represent the surface as the level set of a higher dimensional function and to solve the surface equa

## Abstract An implicit finite element method is presented for the solution of steady and unsteady inviscid compressible flows on triangular meshes under transonic conditions. The method involves a first‐order time‐stepping scheme with a finite element discretization that reduces to central differe