Asymptotic behavior of the least energy solutions to the Choquard equation in dimension two

Abstract

In this paper, we are interested in the following planar Choquard equation equation* cases - u=(∫up+1(y)|x-y|αdy)up, u>0,\ \ &in\ , \ \ u=0, \ \ &on\ ∂ , cases equation* where is a smooth bounded domain in R2, α∈ (0,2) and p>1 is a positive parameter. Unlike the higher-dimensional case, we prove that the least energy solutions up neither blow up nor vanish, and develop only one peak as p+∞ under suitable assumptions on . In contrast, the modified solutions pup exhibit blow-up behavior analogous to that observed in higher dimensions. Furthermore, as α 0, the main results of this paper become consistent with the known conclusions for the corresponding Lane-Emden equation.