%0 Journal Article
%T Existence of bound state solutions for degenerate singular perturbation problems with sign-changing potentials
%A Maria J. Alves
%A Ronaldo B. Assuncao
%A Paulo C. Carriao
%A Olimpio H. Miyagaki
%J Electronic Journal of Differential Equations
%D 2012
%I Texas State University
%X In this article, we study the degenerate singular perturbation problems $$displaylines{ -varepsilon^2hbox{div}(|x|^{-2a} abla u)+|x|^{-2(a+1)}V(x)u = |x|^{-b2^*(a,b)}g(x,u),cr -hbox{div}(|x|^{-2a} abla u)+ lambda |x|^{-2(a+1)}V(x)u = |x|^{-b2^*(a,b)}g(x,u), }$$ for $varepsilon$ small and $lambda$ large positive, where $x in mathbb{R}^N$ with $N geq 3$. We search for solutions that decay to zero as $|x| o +infty$, when g is superlinear in the potential function changes signs. We prove the existence of bound state solutions for degenerate, singular, semilinear elliptic problems. Additionally, when the nonlinearity g(x,u) is an odd function of u, we obtain infinitely many geometrically distinct solutions.
%K Semilinear degenerate elliptic equation
%K singular perturbation
%K variational method
%K sign-changing potential
%K nonlinear Schrodinger equation
%K bound state solution
%U http://ejde.math.txstate.edu/Volumes/2012/109/abstr.html