cdc-coteauxdegaronne
» » Sturmian Theory for Ordinary Differential Equations (Applied Mathematical Sciences)
eBook Sturmian Theory for Ordinary Differential Equations (Applied Mathematical Sciences) ePub

eBook Sturmian Theory for Ordinary Differential Equations (Applied Mathematical Sciences) ePub

by J. Burns,T. Herdman,C. Ahlbrandt,William T. Reid

  • ISBN: 0387905421
  • Category: Mathematics
  • Subcategory: Math Science
  • Author: J. Burns,T. Herdman,C. Ahlbrandt,William T. Reid
  • Language: English
  • Publisher: Springer; Softcover reprint of the original 1st ed. 1980 edition (February 20, 1981)
  • Pages: 560
  • ePub book: 1336 kb
  • Fb2 book: 1280 kb
  • Other: docx mbr mobi txt
  • Rating: 4.2
  • Votes: 195

Description

Theory and techniques for solving differential equations are then applied to solve practical engineering problems.

Theory and techniques for solving differential equations are then applied to solve practical engineering problems. A step-by-step analysis is presented to model the engineering problems using differential equations from physical principles and to solve the differential equations using the easiest possible method.

Equations - Applied Mathematical Sciences 31 (Paperback)

Sturmian Theory for Ordinary Differential Equations - Applied Mathematical Sciences 31 (Paperback). William T. Reid (author), J. Burns (revisor), T. Herdman (revisor), C. Ahlbrandt (revisor). differential equations.

Sturmian Theory for Ordinary Differential Equations. formerly of the Department of Mathematics University of Oklahoma. Sturmian theory for ordinary differential equations. Springer-Verlag New York Heidelberg Berlin. Prepared for publication by John Burns and Terry Herdman Department of Mathematics Virginia Polytechnic Institute. and State University Blacksburg, Virginia 24061/USA. Calvin Ahlbrandt Department of Mathematics University of Missouri Columbia, Missouri 65201/uSA. AMS Subject Classifications: 34-01, 34B25. Applied mathematical sciences; v. 31) Bibliography: p. Includes indexes. I.

Full recovery of all data can take up to 2 weeks! So we came to the decision at this time to double the download limits for all users until the problem is completely resolved. Thanks for your understanding! Progress: 8. 9% restored. Главная Sturmian Theory for Ordinary Differential Equations (Applied Mathematical Sciences). Sturmian Theory for Ordinary Differential Equations (Applied Mathematical Sciences)

Start by marking Sturmian Theory for Ordinary Differential Equations as Want to Read .

Start by marking Sturmian Theory for Ordinary Differential Equations as Want to Read: Want to Read savin. ant to Read.

Applied mathematical sciences ;, v. 31, Applied mathematical sciences (Springer-Verlag New York In. ;, v. 31. Classifications.

Sturmian theory for ordinary differential equations. Are you sure you want to remove Sturmian theory for ordinary differential equations from your list? Sturmian theory for ordinary differential equations. Published 1980 by Springer-Verlag in New York. Applied mathematical sciences ;, v.

Электронная книга "Applied Mathematical Sciences: Sturmian Theory for Ordinary Differential Equations", William T. Reid

Электронная книга "Applied Mathematical Sciences: Sturmian Theory for Ordinary Differential Equations", William T. Reid. Эту книгу можно прочитать в Google Play Книгах на компьютере, а также на устройствах Android и iOS. Выделяйте текст, добавляйте закладки и делайте заметки, скачав книгу "Applied Mathematical Sciences: Sturmian Theory for Ordinary Differential Equations" для чтения в офлайн-режиме.

Bibliographic Information. Applied Mathematical Sciences.

A major portion of the study of the qualitative nature of solutions of differential equations may be traced to the famous 1836 paper of Sturm [1), (here, as elsewhere throughout this manuscript, numbers in square brackets refer to the bibliography at the end of this volume), dealing with oscilla­ tion and comparison theorems for linear homogeneous second order ordinary differential equations. The associated work of Liouville introduced a type of boundary problem known as a "Sturm-Liouville problem", involving, in particular, an introduction to the study of the asymptotic behavior of solu­ tions of linear second order differential equations by the use of integral equations. In the quarter century following the 1891 Gottingen dissertation [1) of Maxime Bacher (1867-1918), he was instru­ mental in the elaboration and extension of the oscillation, separation, and comparison theorems of Sturm, both in his many papers on the subject and his lectures at the Sorbonne in 1913-1914, which were subsequently published as his famous Leaons sur Zes methodes de Sturm [7).