Approximation and Stability Properties of Numerical Methods for Hyperbolic Conservation Laws

The book focuses on stability and approximation results concerning recent numerical methods for the numerical solution of hyperbolic conservation laws. The work begins with a detailed and thorough introduction of hyperbolic conservation/balance laws and their numerical treatment. In the main part, recent results in such context are presented focusing on the investigation of approximation properties of discontinuous Galerkin and flux reconstruction methods, the construction of (entropy) stable numerical methods and the extension of existing (entropy) stability results for both semidiscrete and fully discrete schemes, and development of new high-order methods.

Autorentext

About the author**Philipp Öffne**r is a research associate in the numerical mathematics group at Johannes Gutenberg University Mainz. In his research he focuses on numerical methods for partial differential equations and on scientific computing.

Klappentext

Introduction.- Foundations of Hyperbolic Problems and Numerical Methods.- Recent Progresses.- Attachments.

Inhalt
Introduction.- Foundations of Hyperbolic Problems and Numerical Methods.- Recent Progresses.- Attachments.