Infinitely many sign changing solutions of an elliptic problem involving critical Sobolev and Hardy-Sobolev exponent

Abstract

We study the existence and multiplicity of sign changing solutions of the following equation cases - u = μ |u|2-2u+|u|2*(t)-2u|x|t+a(x)u , u=0 ∂, cases where is a bounded domain in RN, 0∈∂, all the principal curvatures of ∂ at 0 are negative and μ≥ 0, \ \ a>0, \ \ N≥ 7, \ \ 0<t<2, \ \ 2=2NN-2 and 2(t)=2(N-t)N-2.