Symmetry of solutions of a mean field equation on flat tori

Abstract

We study symmetry of solutions of the mean field equation \[ u +(Keu∫Tε Keu -1|Tε| )=0\] on the flat torus Tε=[-12ε, 12ε] × [-12, 12] with 0<ε ≤ 1, where K∈ C2(Tε) is a positive function with - K ≤ |Tε| and ≤ 8π. We prove that if (x0,y0) is a critical point of the function u+ln(K), then u is evenly symmetric about the lines x=x0 and y=y0, provided K is evenly symmetric about these lines. In particular we show that all solutions are one-dimensional if K 1 and ≤ 8π. The results are sharp and answer a conjecture of Lin and Lucia affirmatively. We also prove some symmetry results for mean field equations on annulus.