Nodal solutions for the fractional Yamabe problem on Heisenberg groups

Abstract

We prove that the fractional Yamabe equation Lγ u=|u|4γQ-2γu on the Heisenberg group Hn has [n+12] sequences of nodal (sign-changing) weak solutions whose elements have mutually different nodal properties, where Lγ denotes the CR fractional sub-Laplacian operator on Hn, Q=2n+2 is the homogeneous dimension of Hn, and γ∈ k=1n[k,kQQ-1). Our argument is variational, based on a Ding-type conformal pulling-back transformation of the original problem into a problem on the CR sphere S2n+1 combined with a suitable Hebey-Vaugon-type compactness result and group-theoretical constructions for special subgroups of the unitary group U(n+1).