A Liouville-type theorem in conformally invariant equations

Abstract

Given a smooth function K(x) satisfying a polynomially cone condition and x·∇ K≤ 0, we prove that there is no solution u∈ C∞(R2) of the equation - u=K(x)e2u on\;R2 with u≤ C and ∫R2|K(x)|e2ud x<+∞. As a consequence, there is no such solution if K(x) is a non-constant polynomial with x·∇ K≤ 0. The latter result already includes a result of Struwe(JEMS 2020) as a particular case. Higher order cases are set up with additional assumption on the behavior of u near infinity.