Numerical Methods for Hyperbolic Equations

<p>This volume contains the lecture notes of the Short Course on Numerical Methods for Hyperbolic Equations (Faculty of Mathematics, University of Santiago de Compostela, Spain, 2-4 July 2011). The course was organized in recognition of Prof. Eleuterio Toro‘s contribution to education and training o

Book - 67 pp.<br/>Contents.<br/>ODE IVP: Explicit One-step Methods.<br/>ODE IVP: Implicit One-step Methods.<br/>ODE IVP: Multi-step Methods.<br/>ODE IVP: Stability Concepts.<br/>ODE Boundary Value Problems.<br/>Finite Difference Methods for Parabolic PDEs.<br/>Finite Difference Methods for Hyperboli

Non linearity arises in statistical inference in various ways, with varying degrees of severity, as an obstacle to statistical analysis. More entrenched forms of nonlinearity often require intensive numerical methods to construct estimators, and the use of root search algorithms, or one-step estima

The mainpurpose of the book is to introduce the readers to the numerical integration of the Cauchy problem for delay differential equations (DDEs). Peculiarities and differences that DDEs exhibit with respect to ordinary differential equations are preliminarily outlined by numerous examples illustra

In recent years the study of numerical methods for solving ordinary differential equations has seen many new developments. This second edition of the author's pioneering text is fully revised and updated to acknowledge many of these developments.  It includes a complete treatment of linear multistep

This volume is designed as an introduction to the concepts of modern numerical analysis as they apply to partial differential equations. The book contains many practical problems and their solutions, but at the same time, strives to expose the pitfalls--such as overstability, consistency requirement