EQUATIONS, MATHEMATICS, MATHEMATICAL functions, SET theory, COMPLEX numbers, BOUNDARY value problems, DIFFERENTIAL equations, NONLINEAR theories, MATHEMATICAL analysis
Abstract
The article analyzes the boundary asymptotic behavior of solutions for weighted p(x)-Laplacian equations that take infinite value on a bounded domain. It was found that the boundary asymptotic of solutions of the Laplacian function is continuous and positive. The p(x)-Laplacian possesses more complicated inhomogeneous nonlinearities, thus, some special techniques are needed. Its main difficulty arises from the lack of compactness. The uniqueness and asymptotic behavior of solutions for problem is a nonnegative function which is allowed to vanish on the boundary.