Asymptotic behavior of positive solutions to the Lane-Emden system in dimension two

Abstract

Consider the Lane-Emden system equation*aligned &- u=vp, u>0,~, &- v=uq, v>0,~, &u=v=0,~∂, alignedequation* where is a smooth bounded domain in RN with N≥ 2 and q p>0. The asymptotic behavior of least energy solutions of this system was studied for N≥ 3. However, the case N=2 is different and remains completely open. In this paper, we study the case N=2 with q=p+θp and pθp<+∞. Under the following natural condition that holds for least energy solutions p+∞ p∫∇ up·∇ vp d x<+∞, we give a complete description of the asymptotic behavior of positive solutions (up,vp) (i.e., not only for least energy solutions) as p+. This seems the first result for asymptotic behaviors of the Lane-Emden system in the two dimension case.