Jacqueline Fleckinger, Evans M. Harrell II, & Francois de Thelin
We study the asymptotic behavior of positive solutions of
and related partial differential inequalities, as well as conditions for existence of such solutions. Here, contains the exterior of a ball in , is the p-Laplacian, and is a nonnegative function. Our methods include generalized Riccati transformations, comparison theorems, and the uncertainty principle.
Submitted July 2, 2001. Published December 14, 2001.
Math Subject Classifications: 35B40, 35J60, 35J70.
Key Words: p-Laplacian, Riccati, uncertainty principle.
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| Jacqueline Fleckinger |
CEREMATH & UMR MIP, Universite Toulouse-1
21 allees de Brienne
31000 Toulouse, France
e-mail address: firstname.lastname@example.org
|Evans M. Harrell II |
School of Mathematics, Georgia Tech
Atlanta, GA 30332-0160, USA
e-mail address: email@example.com
| Francois de Thelin |
UMR MIP, Universite Paul Sabatier
31062 Toulouse, France
e-mail address: firstname.lastname@example.org