A moving mesh finite element algorithm for fluid flow problems with moving boundaries

The ®nite element method is developed to solve the problem of wave run-up on a mild, plane slope. A novel approach to implementing a deforming mesh of one-dimensional, three-node, isoparametric elements is described and demonstrated. The discrete time interval (DTI), arbitrary Lagrangian±Eulerian (A

In modern numerical simulation of prospecting and exploiting oil-gas resources and in environmental science, it is necessary to consider numerical method of nonlinear convection-dominated diffusion problems. This thesis, starting from actual conditions such as the three-dimensional characteristics o

This paper presents the formulation, validation, and application of a spectral/hp algorithm for numerical solution of the Navier-Stokes and heat/scalar transport equations in arbitrarily moving complex geometries. The new spectral element algorithm is based on the arbitrary Lagrangian Eulerian formu

In this paper, a space-time finite element method for evolution problems that is second-order accurate in both space and time is proposed. For convection dominated problems, the elements may be aligned along the characteristics in space-time, which results in a Crank-Nicolson method along the charac