Caffarelli-Kohn-Nirenberg type equations of fourth order with the critical exponent and Rellich potential

Abstract

We study the existence/nonexistence of positive solution of 2u-μu|x|4=|u|qβ-2u|x|βin , when is a bounded domain and N≥ 5, qβ=2(N-β)N-4, 0≤ β<4 and 0≤μ<(N(N-4)4)2. We prove the nonexistence result when is an open subset of RN which is star shaped with respect to the origin. We also study the existence of positive solution in when is a bounded domain with non trivial topology and β=0, μ∈(0,μ0), for certain μ0<(N(N-4)4)2 and N≥ 8. Different behavior of PS sequences have been obtained depending on β=0 or β>0.