Mean field type equations on line bundle over a closed Riemann surface

Abstract

Let (L,g) be a line bundle over a closed Riemann surface (,g), (L) be the set of all smooth sections, and D:(L)→ T (L) be a connection independent of the bundle metric g, where T is the cotangent bundle. Suppose that there exists a global unit frame ζ on (L). Precisely for any σ∈(L), there exists a unique smooth function u:→R such that σ=uζ with |ζ| 1 on . For any real number , we define a functional J:W1,2(,L)→R by J(σ)=12∫|D σ|2dvg+ ||∫σ,ζ dvg-∫ h eσ,ζdvg, where W1,2(,L) is a completion of (L) under the usual Sobolev norm, || is the area of (,g), h:→R is a strictly positive smooth function and ·,· is the inner product induced by g. The Euler-Lagrange equations of J are called mean field type equations. Write H0=\σ∈ W1,2(,L):Dσ=0\ and H1=\σ∈ W1,2(,L):∫ σ,τ dvg=0,\,\,∀ τ ∈ H0\. Based on the variational method, we prove that J has a constraint critical point on the space H1 for any <8π; Based on blow-up analysis, we calculate the exact value of ∈fσ∈H1J8π(σ), provided that it is not achieved by any σ∈H1;