Semilinear elliptic equations with nonlinear boundary conditions

We consider the model problem where ⍀ is a bounded region in R with smooth boundary, q g 0, 2 , and Ž . p Ž .

Recently much work has been devoted to periodic-parabolic equations with linear homogeneous boundary conditions. However, very little has been accomplished in the literature for periodic-parabolic problems with nonlinear boundary conditions. It is the purpose of this paper to prove existence and reg

This paper deals with the nonlinear elliptic equationu + u = f (x, u) in a bounded smooth domain Ω ⊂ R N with a nonlinear boundary value condition. The existence results are obtained by the sub-supersolution method and the Mountain Pass Lemma. And nonexistence is also considered.

In this paper, we consider positive classical solutions of h(s) is locally bounded in (0, ∞) and h(s)s -(1+ 2 ν ) is non-decreasing in (0, ∞) for the same ν. We get that the possible solution only depends on t, and several corollaries that include previous results of various authors are established