The Calculus Of Finite Differences
by L. M. Milne Thomson
Publisher: Macmillan and co 1933
Number of pages: 590
Description:
The object of this book is to provide a simple and connected account of the subject of Finite Differences and to present the theory in a form which can be readily applied -- not only the useful material of Boole, but also the more modern developments of the finite calculus. The book is suitable for a first course as well as for more advanced reading. Operational and symbolic methods have been freely used throughout the book.
Download or read it online for free here:
Download link
(multiple formats)
Similar books
![Book cover: Numerical Analysis for Engineering](images/6429.jpg)
by Douglas W. Harder, Richard Khoury - University of Waterloo
Contents: Error Analysis, Numeric Representation, Iteration, Linear Algebra, Interpolation, Least Squares, Taylor Series, Bracketing, The Five Techniques, Root Finding, Optimization, Differentiation, Integration, Initial-value Problems, etc.
(14289 views)
![Book cover: Solving PDEs in Python](images/11792.jpg)
by Hans Petter Langtangen, Anders Logg - Springer
This book offers a concise and gentle introduction to finite element programming in Python based on the popular FEniCS software library. Using a series of examples, it guides readers through the essential steps to quickly solving a PDE in FEniCS.
(6768 views)
![Book cover: Geometric Transformation of Finite Element Methods: Theory and Applications](images/12084.jpg)
by M. Holst, M. Licht - arXiv.org
We present a new technique to apply finite element methods to partial differential equations over curved domains. Bramble-Hilbert lemma is key in harnessing regularity in the physical problem to prove finite element convergence rates for the problem.
(5770 views)
![Book cover: Numerical Stability](images/5529.jpg)
by M.N. Spijker - Leiden University
Stability estimates and resolvent conditions in the numerical solution of initial value problems. Contents: Partial differential equations and numerical methods; Linear algebra; Stability in the numerical solution of differential equations; etc.
(10701 views)