Spectrum of the Lam\'e operator along Reτ=1/2: The genus 3 case

Abstract

In this paper, we study the spectrum σ(L) of the Lam\'e operator equation*L=d2dx2-12(x+z0;τ) in\;\;L2(R, C), equation* where (z;τ) is the Weierstrass elliptic function with periods 1 and τ, and z0∈C is chosen such that L has no singularities on R. We prove that a point λ∈ σ(L) is an intersection point of different spectral arcs but not a zero of the spectral polynomial if and only if λ is a zero of the following cubic polynomial: equation* 415 λ3+85η1 λ2-3g2 λ+9g3-6η1 g2=0. equation* We also study the deformation of the spectrum as τ=12+ib with b>0 varying. We discover 7 different types of graphs for the spectrum as b varies around the double zeros of the spectral polynomial.