Picture 1 of 7
Gallery
Picture 1 of 7
Have one to sell?
ORDINARY DIFFERENTIAL EQUATIONS (SPRINGER TEXTBOOK) By Vladimir Arnold EXCELLENT
US $85.97
ApproximatelyS$ 111.86
or Best Offer
Condition:
Oops! Looks like we're having trouble connecting to our server.
Refresh your browser window to try again.
Pickup:
Free local pickup from Torrance, California, United States.
Shipping:
US $6.00 (approx S$ 7.81) USPS Ground Advantage®.
Located in: Torrance, California, United States
Delivery:
Estimated between Fri, 14 Nov and Tue, 18 Nov to 94104
Returns:
No returns accepted.
Coverage:
Read item description or contact seller for details. See all detailsSee all details on coverage
(Not eligible for eBay purchase protection programmes)
Seller assumes all responsibility for this listing.
eBay item number:356390001538
Item specifics
- Condition
- Book Title
- Ordinary Differential Equations (Springer Textbook)
- Item Height
- 0.77 inches
- ISBN-10
- 3540548130
- ISBN
- 9783540548133
About this product
Product Identifiers
Publisher
Springer
ISBN-10
3540548130
ISBN-13
9783540548133
eBay Product ID (ePID)
4432204
Product Key Features
Number of Pages
IV, 338 Pages
Language
English
Publication Name
Ordinary Differential Equations
Publication Year
1992
Subject
Differential Equations / General, Physics / Mathematical & Computational, Mathematical Analysis
Type
Textbook
Subject Area
Mathematics, Science
Series
Springer Textbook Ser.
Format
Trade Paperback
Dimensions
Item Weight
16.6 Oz
Item Length
9.3 in
Item Width
6.1 in
Additional Product Features
Intended Audience
Scholarly & Professional
Reviews
From the reviews: "Professor Arnold has expanded his classic book to include new material on exponential growth, predator-prey, the pendulum, impulse response, symmetry groups and group actions, perturbation and bifurcation ... . The new edition is highly recommended as a general reference for the essential theory of ordinary differential equations and as a textbook for an introductory course for serious undergraduate or graduate students. ... In the US system, it is an excellent text for an introductory graduate course." (Carmen Chicone, SIAM Review, Vol. 49 (2), 2007) "Vladimir Arnold's is a master, not just of the technical realm of differential equations but of pedagogy and exposition as well. ... The writing throughout is crisp and clear. ... Arnold's says that the book is based on a year-long sequence of lectures for second-year mathematics majors in Moscow. In the U.S., this material is probably most appropriate for advanced undergraduates or first-year graduate students." (William J. Satzer, MathDL, August, 2007)
Number of Volumes
1 vol.
Illustrated
Yes
Original Language
Russian
Synopsis
The first two chapters of this book have been thoroughly revised and sig nificantly expanded. Sections have been added on elementary methods of in tegration (on homogeneous and inhomogeneous first-order linear equations and on homogeneous and quasi-homogeneous equations), on first-order linear and quasi-linear partial differential equations, on equations not solved for the derivative, and on Sturm's theorems on the zeros of second-order linear equa tions. Thus the new edition contains all the questions of the current syllabus in the theory of ordinary differential equations. In discussing special devices for integration the author has tried through out to lay bare the geometric essence of the methods being studied and to show how these methods work in applications, especially in mechanics. Thus to solve an inhomogeneous linear equation we introduce the delta-function and calculate the retarded Green's function; quasi-homogeneous equations lead to the theory of similarity and the law of universal gravitation, while the theorem on differentiability of the solution with respect to the initial conditions leads to the study of the relative motion of celestial bodies in neighboring orbits. The author has permitted himself to include some historical digressions in this preface. Differential equations were invented by Newton (1642-1727)., Few books on Ordinary Differential Equations (ODEs) have the elegant geometric insight of this one, which puts emphasis on the qualitative and geometric properties of ODEs and their solutions, rather than on routine presentation of algorithms. From the reviews: "Professor Arnold has expanded his classic book to include new material on exponential growth, predator-prey, the pendulum, impulse response, symmetry groups and group actions, perturbation and bifurcation." --SIAM REVIEW, Few books on ODEs have the elegant geometric insight of this one, which puts a clear emphasis on the qualitative and geometric properties of ODEs and their solutions, rather than on routine presentation of algorithms. In many instances, the author employs physical reasoning as shorthand for much longer formal mathematical reasoning., The first two chapters of this book have been thoroughly revised and sig nificantly expanded. Sections have been added on elementary methods of in tegration (on homogeneous and inhomogeneous first-order linear equations and on homogeneous and quasi-homogeneous equations), on first-order linear and quasi-linear partial differential equations, on equations not solved for the derivative, and on Sturm's theorems on the zeros of second-order linear equa tions. Thus the new edition contains all the questions of the current syllabus in the theory of ordinary differential equations. In discussing special devices for integration the author has tried through out to lay bare the geometric essence of the methods being studied and to show how these methods work in applications, especially in mechanics. Thus to solve an inhomogeneous linear equation we introduce the delta-function and calculate the retarded Green's function; quasi-homogeneous equations lead to the theory of similarity and the law of universal gravitation, while the theorem on differentiability of the solution with respect to the initial conditions leads to the study of the relative motion of celestial bodies in neighboring orbits. The author has permitted himself to include some historical digressions in this preface. Differential equations were invented by Newton (1642-1727)."
LC Classification Number
QA299.6-433QC19.2-2
Item description from the seller
Seller feedback (281)
- 3***e (6)- Feedback left by buyer.Past 6 monthsVerified purchaseThis seller communicates very well, ships same or next day, great packing preserved the use book I bought. The book was in stellar condition also. I found this seller to be reliable and trustworthy.Design and Composition by Nathan Goldstein (1989, Trade Paperback) (#356641449939)
- h***n (101)- Feedback left by buyer.Past monthVerified purchaseWhat a wonderful book! Good condition, great quality. Looks good. Fast Postage, good packaging. Such a great and lovely thing as described. Great value! Love it! And it is a pleasant communication with the seller!
- a***n (2690)- Feedback left by buyer.Past monthVerified purchaseGreat Ebayer!!! Item as described; packed well and shipped FAST!!! Highly Recommend!!!
Seller feedback (281)
- 3***e (6)- Feedback left by buyer.Past 6 monthsVerified purchaseThis seller communicates very well, ships same or next day, great packing preserved the use book I bought. The book was in stellar condition also. I found this seller to be reliable and trustworthy.Design and Composition by Nathan Goldstein (1989, Trade Paperback) (#356641449939)
- h***n (101)- Feedback left by buyer.Past monthVerified purchaseWhat a wonderful book! Good condition, great quality. Looks good. Fast Postage, good packaging. Such a great and lovely thing as described. Great value! Love it! And it is a pleasant communication with the seller!
- a***n (2690)- Feedback left by buyer.Past monthVerified purchaseGreat Ebayer!!! Item as described; packed well and shipped FAST!!! Highly Recommend!!!