A necessary and sufficient condition for the Darboux-Treibich-Verdier potential with its spectrum contained in R

Abstract

In this paper, we study the spectrum of the complex Hill operator L=d2dx2+q(x;τ) in L2(R,C) with the Darboux-Treibich-Verdier potential \[q(x;τ):=-Σk=03nk(nk+1) ( x+z0+ωk2;τ ),\] where nk∈Z≥ 0 with nk≥ 1 and z0∈C is chosen such that q(x;τ) has no singularities on R. For any fixed τ∈ iR>0, we give a necessary and sufficient condition on (n0,n1,n2,n3) to guarantee that the spectrum σ(L) is \[σ(L)=(-∞, E2g][E2g-1, E2g-2] ·s [E1, E0], Ej∈ R,\] and hence generalizes Ince's remarkable result in 1940 for the Lam\'e potential to the Darboux-Treibich-Verdier potential. We also determine the number of (anti)periodic eigenvalues in each bounded interval (E2j-1, E2j-2), which generalizes the recent result in HHV where the Lam\'e case n1=n2=n3=0 was studied.