On the existence of nontrivial solutions for p-harmonic equations on 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.

In this paper we study polynomial Dirac equation p(D)f = 0 including (D-k)f = 0 with complex parameter k and D k f = 0(k ≥ 1) as special cases over unbounded subdomains of R n+1 . Using the Clifford calculus, we obtain the integral representation theorems for solutions to the equations satisfying ce

In this paper we study solutions, possibly unbounded and sign-changing, of the Lane-Emden equationu = |u| p-1 u on unbounded domains of R N with N 2 and p > 1. We prove various classification theorems and Liouville-type results for C 2 solutions belonging to one of the following classes: stable solu

## As (u•∇)u Au +C \* ∇u 3 +C \* u 2 , with C \* a positive constant that is independent of the 'size' of domain, one gets