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Introduction to Numerical Methods in Differential Equations (Texts in Applied Mathematics) | 
 enlarge | Author: Mark H. Holmes
Publisher: Springer
Category: Book
List Price: $54.95
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Rating:  1 reviews
Sales Rank: 1353079
Media: Hardcover
Edition: 1
Pages: 238
Number Of Items: 1
Shipping Weight (lbs): 1.1
Dimensions (in): 9.2 x 6.3 x 0.7
ISBN: 0387308911
Dewey Decimal Number: 518.6
EAN: 9780387308913
Publication Date: October 24, 2006
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Condition: Legendary independent bookstore online since 1994. Reliable customer service and no-hassle return policy. / Texts in Applied Mathematics #52: Introduction to Numerical Methods in Differential Equations
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Product Description
This is a textbook for upper division undergraduates and beginning graduate students. Its objective is that students learn to derive, test and analyze numerical methods for solving differential equations, and this includes both ordinary and partial differential equations. In this sense the book is constructive rather than theoretical, with the intention that the students learn to solve differential equations numerically and understand the mathematical and computational issues that arise when this is done. An essential component of this is the exercises, which develop both the analytical and computational aspects of the material. The importance of the subject of the book is that most laws of physics involve differential equations, as do the modern theories on financial assets. Moreover many computer animation methods are now based on physics based rules and are heavily invested in differential equations. Consequently numerical methods for differential equations are important for multiple areas. The author currently teaches at Rensselaer Polytechnic Institute and is an expert in his field. He has previously published a book with Springer, Introduction to Perturbation Methods.
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| Customer Reviews:
A good text from a great scholar and professor. December 17, 2007
Andrew W. Hill
First, for the purposes of disclosure, let me state for the record that I took this course (Introduction to Numerical Methods for Differential Equations) from Professor Holmes at Rensselaer. At the time, he was compiling notes for the completion of this text, so he taught us from those notes. Now that the disclosure part is out of the way, I must also state that I am totally biased in this review. Professor Holmes was one of the most passionate, articulate, and knowledgeable professors I had during my mathematics career at RPI.
It is nice to see Professor Holmes's ease of explanation spill over into this written work. In class we had a different text as a resource which used overly-convoluted notation and difficult-to-follow logic and explanations. In stark contrast, Holmes's work uses much more reasonable notation that demonstrates his true understanding of the material through the ease in which he disseminates the important information. Holmes is a standout in his field for these reasons, and I hope he continues to contribute to academia as long as he possibly can.
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