A hybrid finite element/finite difference algorithm for compressible/incompressible viscoelastic liquids

A new finite element formulation designed for both compressible and nearly incompressible viscous flows is presented. The formulation combines conservative and non-conservative dependent variables, namely, the mass-velocity (densityvelocity), internal energy and pressure. The central feature of the

In this letter, a hybrid algorithm combining the direct method with the iterati¨e method is designed for sol¨ing the FE᎐BI matrix equation, which not only can take full ad¨antage of the multile¨el ( ) fast multipole algorithm MLFMA , but also can significantly speed up the rate of con¨ergence. Numer

This paper presents an algorithm for two-dimensional steady viscoelastic flow simulation in which the solution of the momentum and continuity equations is decoupled from that of the constitutive equations. The governing equations are discretized by the finite element method, with 3 x 3 element subdi

We present the results of some numerical experiments which were carried out in order to investigate the general characteristics of the algorithm described in Part 1 of this paper.

In this paper, we investigate some cost-effective hybrid V -cycle multilevel algorithms for the discrete systems that arise when a mixed finite element approach is used to solve certain second-order elliptic boundary value problems. By introducing a small penalty parameter, the perturbed indefinite