An algebraic construction of a solution to the mean field equations on hyperelliptic Curves and its diabatic limit
Abstract
In this paper, we give an algebraic construction of the solution to the following mean field equation +e=4πΣi=12g+2δPi, on a genus g≥ 2 hyperelliptic curve (X,ds2) where ds2 is a canonical metric on X and \P1,·s,P2g+2\ is the set of Weierstrass points on X. Furthermore, we study the rescaled equation +γ e=4πγ Σi=12g+2δPi and its adiabatic limit at γ=0.
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