The existence of ground state solutions for critical H\'enon equations in RN

Abstract

In this paper we confirm that 2*(γ)=2(N+γ)N-2 with γ>0 is exactly the critical exponent for the embedding from Hr1(RN) into Lq(RN;|x|γ)(N≥slant 3) (see 2007SWW-1,2007SWW-2) and name it as the upper H\'enon-Sobolev critical exponent. Based on this fact we study the ground state solutions of critical H\'enon equations in RN via the Nehari manifold methods and the great idea of Brezis-Nirenberg in 1983BN. We establish the existence of the positive radial ground state solutions for the problem with one single upper H\'enon-Sobolev critical exponent. We also deal with the existence of the nonnegative radial ground state solutions for the problems with multiple critical exponents, including Hardy-Sobolev critical exponents or Sobolev critical exponents or the upper H\'enon-Sobolev critical exponents.

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