Weyl type asymptotics and bounds for the eigenvalues of functional-difference operators for mirror curves

Abstract

We investigate Weyl type asymptotics of functional-difference operators associated to mirror curves of special del Pezzo Calabi-Yau threefolds. These operators are H(ζ)=U+U-1+V+ζ V-1 and Hm,n=U+V+q-mnU-mV-n, where U and V are self-adjoint Weyl operators satisfying UV=q2VU with q=eiπ b2, b>0 and ζ>0, m,n∈N. We prove that H(ζ) and Hm,n are self-adjoint operators with purely discrete spectrum on L2(R). Using the coherent state transform we find the asymptotical behaviour for the Riesz mean Σj 1(λ-λj)+ as λ∞ and prove the Weyl law for the eigenvalue counting function N(λ) for these operators, which imply that their inverses are of trace class.