Symmetry breaking and Morse index of solutions of nonlinear elliptic problems in the plane

Abstract

In this paper we study the problem - u =(2+α2)2xαf(λ,u), & inB1 \\ u > 0, & inB1 u = 0, & on ∂ B1 where B1 is the unit ball of 2, f is a smooth nonlinearity and , are real numbers with >0. From a careful study of the linearized operator we compute the Morse index of some radial solutions to i0. Moreover, using the bifurcation theory, we prove the existence of branches of nonradial solutions for suitable values of the positive parameter . The case f(λ,u)= eu provides more detailed information.