The A Priori Estimate and Existence of the Positive Solution for A Nonlinear System Involving the Fractional Laplacian

Abstract

In the paper, we consider the fractional elliptic system equation*\arrayll (- )α12u(x)+Σni=1bi(x)∂ u∂ xi+B(x)u(x)=f(x,u,v),& in ,\\ (- )α22v(x)+Σni=1ci(x)∂ v∂ xi+C(x)v(x)=g(x,u,v),& in ,\\ u=v=0, & in Rn, array .a-1.2 equation* where is a bounded domain with C2 boundary in Rn and n>\α1,α2\. We first utilize the blowing-up and re-scaling method to derive the a priori estimate for positive solutions when 1<α1,α2 <2. Then for 0<α1,α2 <1, we obtain the regularity estimate of positive solutions. On top of this, using the topological degree theory we prove the existence of positive solutions.