High-Order Taylor-Galerkin Methods for Linear Hyperbolic Systems

## Communicated by W. To¨rnig We consider characteristic Galerkin methods for the solution of hyperbolic systems of partial differential equations of first order. A new recipe for the construction of approximate evolution operators is given in order to derive consistent methods. With the help of s

We present new truly multidimensional schemes of higher order within the framework of finite volume evolution Galerkin (FVEG) methods for systems of nonlinear hyperbolic conservation laws. These methods couple a finite volume formulation with approximate evolution operators. The latter are construct

In this paper we describe the implementation and development of a new Taylor-Galerkin finite-element scheme within an unstructured/hybrid, parallel solver. The scheme has been specifically conceived for unsteady LES: it is third-order in space and time and has a low dissipative error. Minimal additi