Classification of solutions to conformally invariant systems with mixed order and exponentially increasing or nonlocal nonlinearity

Abstract

In this paper, without any assumption on v and under extremely mild assumption u(x)=O(|x|K) at ∞ for some K1 arbitrarily large, we prove classification of solutions to the following conformally invariant system with mixed order and exponentially increasing nonlinearity in R2: equation*\\cases (-)12u(x)=epv(x), x∈R2, \\ - v(x)=u4(x), x∈R2, casesequation* where p∈(0,+∞), u≥ 0 and satisfies the finite total curvature condition ∫R2u4(x)dx<+∞. In order to show integral representation formula and crucial asymptotic property for v, we derive and use an L+L L inequality, which is itself of independent interest. When p=32, the system is closely related to single conformally invariant equations (-)12u=u3 and - v=e2v on R2, which have been quite extensively studied (cf. BF,C,CY,CL,CLL,CLZ etc). We also derive classification results for nonnegative solutions to conformally invariant system with mixed order and Hartree type nonlocal nonlinearity in R3. Extensions to mixed order conformally invariant systems in Rn with general dimensions n≥3 are also included.