Nonlinear partial differential equations and free boundaries (Research notes in mathematics) (v. 1)
Díaz, J. I
In This Research Note The Author Brings Together The Body Of Known Work And Presents Many Recent Results Relating To Nonlinear Partial Differential Equations That Give Rise To A Free Boundary--usually The Boundary Of The Set Where The Solution Vanishes Identically. The Formation Of Such A Boundary Depends On An Adequate Balance Between Two Of The Terms Of The Equation That Represent The Particular Characteristics Of The Phenomenon Under Consideration: Diffusion, Absorption, Convection, Evolution Etc. These Balances Do Not Occur In The Case Of A Linear Equation Or An Arbitrary Nonlinear Equation. Their Characterization Is Studied For Several Classes Of Nonlinear Equations Relating To Applications Such As Chemical Reactions, Non-newtonian Fluids, Flow Through Porous Media And Biological Populations. In This First Volume, The Free Boundary For Nonlinear Elliptic Equations Is Discussed. A Second Volume Dealing With Parabolic And Hyperbolic Equations Is In Preparation. V. 1. Elliptic Equations. J.i. Diaz. Includes Index. Bibliography: V. 1, P. 292-318.
| Name in long format: | Nonlinear partial differential equations and free boundaries (Research notes in mathematics) (v. 1) |
|---|---|
| ISBN-10: | 0273085727 |
| ISBN-13: | 9780273085720 |
| Book pages: | 336 |
| Book language: | en |
| Binding: | Paperback |
| Publisher: | Pitman Advanced Pub. Program |
