Critical points of the Moser-Trudinger functional on closed surfaces

Abstract

Given a closed Riemann surface (,g) and any positive smooth weight, we use a minmax scheme together with compactness, quantization results and with sharp energy estimates to prove the existence of positive critical points of the functional Jp,β(u)=2-p2(p\|u\|H122β )p2-p- ∫ (eu+p-1) f dvg, for every p∈ (1,2) and β>0, or for p=1 and β∈ (0,∞) 4πN. Letting p 2 we obtain positive critical points of the Moser-Trudinger functional F(u):=∫ (eu2-1)f dvg constrained to Eβ:=\v s.t. \|v\|H12=β\ for any β>0.