Kniha Recent Developments in Discontinuous Galerkin Finite Element Methods for Partial Differential Equations Xiaobing Feng

Recent Developments in Discontinuous Galerkin Finite Element Methods for Partial Differential Equations

2012 John H Barrett Memorial Lectures

Jazyk: Angličtina
Väzba: Pevná
Dostupnosť: Skladom u dodávateľa
Odosielame za 10-13 dní
99.88
The field of discontinuous Galerkin finite element methods has attracted considerable recent attenti...

Informácie o knihe

Jazyk
Angličtina
Väzba
Kniha - Pevná
Vydalo
2013
Stránok
279
EAN
9783319018171
ISBN
3319018175
Enbook ID
02006166
Hmotnosť
6149
Rozmery
155 x 235 x 22

Kompletný popis

The field of discontinuous Galerkin finite element methods has attracted considerable recent attention from scholars in the applied sciences and engineering. This volume brings together scholars working in this area, each representing a particular theme or direction of current research. Derived from the 2012 Barrett Lectures at the University of Tennessee, the papers reflect the state of the field today and point toward possibilities for future inquiry. The longer survey lectures, delivered by Franco Brezzi and Chi-Wang Shu, respectively, focus on theoretical aspects of discontinuous Galerkin methods for elliptic and evolution problems. Other papers apply DG methods to cases involving radiative transport equations, error estimates, and time-discrete higher order ALE functions, among other areas. Combining focused case studies with longer sections of expository discussion, this book will be an indispensable reference for researchers and students working with discontinuous Galerkin finite element methods and its applications.

Mohlo by vás zaujímať

Rome For Ever

BERRUTI MASSIMO
37.47
18.14
25.70

J's Regret

Jessie A. Snow
18.24
24.32
14.22

Accra City Guide

Eric MacLean Ntiamoah Duah
36.20
9.61
12.84
71.13

Common Faith

Kevin Mott-Thornton
162.38
27.86

Zákazníci, ktorí si kúpili túto knihu, kúpili tiež

Ziri Eta Mara

Etxebarria
28.45
11.18
19.12
47.78
32.47
12.94
8.43
14.61