Overview
This book develops a systematic and rigorous mathematical theory of finite difference methods for linear elliptic, parabolic and hyperbolic partial differential equations with nonsmooth solutions. Finite difference methods are a classical class of techniques for the numerical approximation of partial differential equations. Traditionally, their convergence analysis presupposes the smoothness of the coefficients, source terms, initial and boundary data, and of the associated solution to the differential equation. This then enables the application of elementary analytical tools to explore their stability and accuracy. The assumptions on the smoothness of the data and of the associated analytical solution are however frequently unrealistic. There is a wealth of boundary – and initial – value problems, arising from various applications in physics and engineering, where the data and the corresponding solution exhibit lack of regularity. In such instances classical techniques for the error analysis of finite difference schemes break down. The objective of this book is to develop the mathematical theory of finite difference schemes for linear partial differential equations with nonsmooth solutions. Analysis of Finite Difference Schemes is aimed at researchers and graduate students interested in the mathematical theory of numerical methods for the approximate solution of partial differential equations.
Full Product Details
Author: Boško S. Jovanović ,
Endre Süli
Publisher: Springer London Ltd
Imprint: Springer London Ltd
Edition: Softcover reprint of the original 1st ed. 2014
Volume: 46
Dimensions:
Width: 15.50cm
, Height: 2.20cm
, Length: 23.50cm
Weight: 0.646kg
ISBN: 9781447172598
ISBN 10: 1447172590
Pages: 408
Publication Date: 23 August 2016
Audience:
Professional and scholarly
,
Professional & Vocational
Format: Paperback
Publisher's Status: Active
Availability: Manufactured on demand
We will order this item for you from a manufactured on demand supplier.
Reviews
While there are plenty of books on finite difference (FD) schemes for linear PDE in case of smooth coefficients and inhomogeneous terms, the literature seems lacking when it comes to the nonsmooth case. This monograph fills the gap. ... The text addresses graduate students in mathematics and researchers. (M. Muthsam, Monatshefte fur Mathematik, 2016) The authors present a new monograph on finite difference schemes for pde's with weak solutions. ... readable for specialist working in the field of numerical analysis, maybe including excellent graduate students of mathematics. ... for scientists interested in the analysis of discretization methods for very weak solutions, including solutions in Besov or Bessel-potential spaces, the monography presents many fruitful ideas and useful ingredients. (H.-G. Roos, Zeitschrift fur Angewandte Mathematik und Mechanik, Vol. 94 (11), 2014)
While there are plenty of books on finite difference (FD) schemes for linear PDE in case of smooth coefficients and inhomogeneous terms, the literature seems lacking when it comes to the nonsmooth case. This monograph fills the gap. ... The text addresses graduate students in mathematics and researchers. (M. Muthsam, Monatshefte fur Mathematik, 2016) The authors present a new monograph on finite difference schemes for pde's with weak solutions. ... readable for specialist working in the field of numerical analysis, maybe including excellent graduate students of mathematics. ... for scientists interested in the analysis of discretization methods for very weak solutions, including solutions in Besov or Bessel-potential spaces, the monography presents many fruitful ideas and useful ingredients. (H.-G. Roos, Zeitschrift fur Angewandte Mathematik und Mechanik, Vol. 94 (11), 2014)
