A remark on the existence and multiplicity result for a nonlinear elliptic problem involving the p-Laplacian

In this paper, we study a class of one-dimensional p-Laplacian boundary value problem with generalized Sturm-Liouville boundary conditions. Some results are obtained for existence of at least three positive solutions by using the related fixed point theory. The interesting point is the nonlinear ter

In this work, motivated by [T.F. Wu, The Nehari manifold for a semilinear elliptic system involving sign-changing weight function, Nonlinear. Anal. 68 (2008) 1733-1745], and using recent ideas from Brown and Wu [K.J. Brown, T.F. Wu, A semilinear elliptic system involving nonlinear boundary condition

We prove the existence of bounded solutions for a class of nonlinear elliptic problems whose model is in the form: -div(a(x; u; Du)) = k1(|u|)|Du| p + k2(|u|)f; u ∈ W 1;p 0 ( ) ∩ L ∞ ( ); (\*) where a(x; Á; ) ¿ b(|Á|)| | p , b is a continuous monotone decreasing function and k1 and k2 are continuous