Wavelet-Galerkin Discretization of Hyperbolic Equations

The compactly supported orthogonal wavelet bases developed by Daubechies are used in the Galerkin scheme for a class of one-dimensional ®rst-order quasilinear conservation equations with perturbed dissipative terms. We ®rst develop a recursive algorithm to obtain the wavelet coecients of a dissipati

The high speed flow of complex materials can often be modeled by the compressible Euler equations coupled to (possibly many) additional advection equations. Traditionally, good computational results have been obtained by writing these systems in fully conservative form and applying the general metho

The characteristic Galerkin finite element method for the discrete Boltzmann equation is presented to simulate fluid flows in complex geometries. The inherent geometric flexibility of the finite element method permits the easy use of simple Cartesian variables on unstructured meshes and the mesh clu