Various new methods for the solution of hyperbolic systems of conservation laws in one, two and three space dimensions are developed. All are explicit, conservative timemarching methods that are second order accurate in space and time in regions of smooth flow and make use of local Riemann problems at intercell boundaries. In one space dimension, the Weighted Average Flux (w af ) approach of Toro is extended to generate a scheme that is stable with timesteps twice as large as those allowed by the stability conditions of the original scheme. A Riemann problem based extension of the Warming-Beam scheme is considered. Total Variation Diminishing (t v d ) conditions are enforced for both schemes. Numerical results for the Euler Equations ...
An essentially nonoscillatory (ENO) formulation is described for hyperbolic systems of conservation ...
Three topics on modern shock capturing methods for the time-dependent Euler equations of Gas Dynamic...
AbstractThis work describes an unsplit, second-order accurate algorithm for multidimensional systems...
In recent years, a class of numerical schemes for solving hyperbolic partial differential equations ...
Second- and third-order two time-level five-point explicit upwind-difference schemes are described f...
Current numerical methods used in production-level CFD codes are found to be lacking in many respect...
Taking underlying physics into consideration is essential in the design of numerical schemes for flu...
This thesis examines the properties, applications and usefulness of the different conservation lawsi...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
The present work is concerned with the extension of the theory of characteristics to conservation la...
In this thesis we consider a class of conservation based moving mesh methods applied to hyperbolic c...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
The development of numerical methods for hyperbolic conservation laws has been a rapidly growing are...
A new class of numerical methods called Active Flux (AF) is investigated for nonlinear hyperbolic co...
This work describes an unsplit, second-order accurate algorithm for multidimensional systems of hype...
An essentially nonoscillatory (ENO) formulation is described for hyperbolic systems of conservation ...
Three topics on modern shock capturing methods for the time-dependent Euler equations of Gas Dynamic...
AbstractThis work describes an unsplit, second-order accurate algorithm for multidimensional systems...
In recent years, a class of numerical schemes for solving hyperbolic partial differential equations ...
Second- and third-order two time-level five-point explicit upwind-difference schemes are described f...
Current numerical methods used in production-level CFD codes are found to be lacking in many respect...
Taking underlying physics into consideration is essential in the design of numerical schemes for flu...
This thesis examines the properties, applications and usefulness of the different conservation lawsi...
AbstractIn this paper we first briefly review the very high order ADER methods for solving hyperboli...
The present work is concerned with the extension of the theory of characteristics to conservation la...
In this thesis we consider a class of conservation based moving mesh methods applied to hyperbolic c...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
The development of numerical methods for hyperbolic conservation laws has been a rapidly growing are...
A new class of numerical methods called Active Flux (AF) is investigated for nonlinear hyperbolic co...
This work describes an unsplit, second-order accurate algorithm for multidimensional systems of hype...
An essentially nonoscillatory (ENO) formulation is described for hyperbolic systems of conservation ...
Three topics on modern shock capturing methods for the time-dependent Euler equations of Gas Dynamic...
AbstractThis work describes an unsplit, second-order accurate algorithm for multidimensional systems...