A Liouville type result for fractional GJMS equations on higher dimensional spheres

Abstract

Let n be an integer and s be a real number such that n > 2s ≥ 2. Inspired by the perturbation approach initiated by F. Hang and P. Yang (Int. Math. Res. Not. IMRN, 2020), we are interested in non-negative, smooth solution v to the following higher-order fractional equation \[ Pn2s(v) = Qn2s( v+vα) \] on Sn with 0<α ≤ (n+2s)/(n-2s), and ≥ 0. Here Pn2s is the fractional GJMS type operator of order 2s on Sn and Qn2s = Pn2s(1) is constant. We show that if >0 and 0<α ≤ (n+2s)/(n-2s), then any positive, smooth solution v to the above equation must be constant. The same result remains valid if =0 but with 0<α < (n+2s)/(n-2s).As a by-product, with 0<α≤ (n+2s)/(n-2s), we compute the sharp constant of the subcritical/critical Sobolev inequalities \[ ∫ Sn v Pn2s (v) dμg Sn ≥ (n/2 + s) (n/2 - s ) | Sn|α-1α+1 ( ∫ Sn vα+1 dμg Sn )2α+1. \] for the GJMS operator Pn2s on Sn and for all non-negative functions v∈ Hs( Sn).