The geometry of generalized Lam\'e equation, II: Existence of pre-modular forms and application

Abstract

In this paper, the second in a series, we continue to study the generalized Lam\'e equation with the Treibich-Verdier potential equation* y (z)=[ Σk=03nk(nk+1)(z+ ωk2|τ)+B] y(z), nk∈ Z≥0 equation* from the monodromy aspect. We prove the existence of a pre-modular form Zr,sn(τ) of weight 12Σ nk(nk+1) such that the monodromy data (r,s) is characterized by Zr,sn(τ)=0. This generalizes the result in LW2, where the Lam\'e case (i.e. n1=n2=n3=0) was studied by Wang and the third author. As applications, we prove among other things that the following two mean field equations \[ u+eu=16πδ0 u+eu=8πΣk=13δωk2\] on a flat torus Eτ:=C/(Z+Zτ) has the same number of even solutions. This result is quite surprising from the PDE point of view.