The geometry of generalized Lam\'e equation, I

Abstract

In this paper, we prove that the spectral curve n of 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* can be embedded into the symmetric space SymNEτ of the N-th copy of the torus Eτ, where N=Σ nk. This embedding induces an addition map σn(·|τ) from n onto Eτ. The main result is to prove that the degree of σ % n(·|τ) is equal to% equation* Σk=03nk(nk+1)/2. equation* This is the first step toward constructing the premodular form associated with this generalized Lam\'e equation.