Principal eigenvalue of the p-laplacian in RN

and the associated problem with homogeneous principal part, < < py2 < < py2 ydiv a x ٌu ٌu sg x u u q f , x, u , 2 0 in R N and may be singular or degenerate at infinity, no growth restriction on Ž . a x, и is postulated, and both f and g may change sign.

We study nonlinear eigenvalue problems for the p-Laplace operator subject to different kinds of boundary conditions on a bounded domain. Using the Ljusternik-Schnirelman principle, we show the existence of a nondecreasing sequence of nonnegative eigenvalues. We prove the simplicity and isolation of

We consider the boundary value problem ϕ p u + λF t u = 0, with p > 1, t ∈ 0 1 , u 0 = u 1 = 0, and with λ > 0. The value of λ is chosen so that the boundary value problem has a positive solution. In addition, we derive an explicit interval for λ such that, for any λ in this interval, the existence

The nonlinear eigenvalue problem for p-Laplacian -div (a(x) is considered. We assume that 1 < p < N and that the functionfis of subcritical growth with respect to the variable u. The existence and C'."-regularity of the weak solution is proved.