Blow-up in Quasilinear Parabolic Equations

Blow-up in Quasilinear Parabolic Equations

4.11 - 1251 ratings - Source

Presents some mathematical aspects of the theory of blow-up phenomena in nonlinear continua, analyzing their distinguishing properties using quasilinear heat equations and certain systems of quasilinear equations. Based on research from the past 15 years or so at the Russian Academy of Sciences, discusses a number of extraordinary properties of unbounded solutions of many nonlinear boundary problems, the results of numerical experimentation into the spatio-temporal structure of blow-up phenomena, and more common properties and their manifestations in various dissipative media. The results define the main range of questions and the directions of development of blow-up theory; indicate the primary requirements for the theoretical study of unbounded solutions; and demonstrate how to determine the simplest nonlinear models of heat conduction and combustion that exhibit the universal properties of blow-up phenomena. Originally published in Russian by Nauka, Moscow, in 1987. The index is one slender page. Annotation copyright by Book News, Inc., Portland, ORThe aim of the series is to present new and important developments in pure and applied mathematics.

Title:Blow-up in Quasilinear Parabolic Equations
Author: Aleksandr Andreevich Samarskiĭ
Publisher:Walter de Gruyter - 1995

You must register with us as either a Registered User before you can Download this Book. You'll be greeted by a simple sign-up page.

Once you have finished the sign-up process, you will be redirected to your download Book page.

How it works:
  • 1. Register a free 1 month Trial Account.
  • 2. Download as many books as you like (Personal use)
  • 3. Cancel the membership at any time if not satisfied.

Click button below to register and download Ebook
Privacy Policy | Contact | DMCA