Existence result for a gradient-type elliptic system involving a pair of p(x) and q(x)-Laplacian operators |
| |
| Authors: | J. Vélin |
| |
| Affiliation: | Department of Mathematics and Computer, CEREGMIA Laboratory, University of Antilles, Campus of Fouillole, 97159Pointe-à-Pitre, Guadeloupe (F.W.I). |
| |
| Abstract: | ![]()
In this paper, we deal with a typical gradient elliptic system involving a pair of p(x) and q(x)-Laplacian operators. Furthermore, the system may have nonlinearities with sign-changing. Precisely, we are interested in seeking at least one weak nontrivial solution. In this way, we establish explicitly a pair of lower and upper solutions having radial forms and related to the system. By applying the theory of monotone operators, we show that the system possesses at least one non-trivial and bounded solution. |
| |
| Keywords: | p(x)-Laplacian variable exponent lower solution upper solution gradient-type elliptic system |
|
|
