Regular solutions of a nonlinear model for vibrations of beams in unbounded domains

In this paper, we study the existence of positive solutions for p(x)-Laplacian equations in unbounded domains. The existence is affected by the properties of the geometry and the topology of the domain.

We are interested in the following nonlinear elliptic equation u + u (., u) = 0 in D, where D is a smooth unbounded domain in R 2 . Under appropriate conditions on the nonlinearity (x, t), related to a certain Kato class, we give some existence results and asymptotic behavior for positive solutions

In this paper, we study the existence of positive solutions to nonlinear elliptic boundary value problems on unbounded domains ! ⊂ R n with cylindrical ends for a general nonlinear term f(u) including f(u) = u p + ; 1 ¡ p ¡ (n + 2)=(n -2)(n ¿ 3); + ∞ (n = 2) as a typical example: by using the mount