Asymptotics of spectral gaps of 1D Dirac operator with two exponential terms potential

Abstract

The one-dimensional Dirac operator equation* L = i pmatrix 1 & 0 \\ 0 & -1 pmatrix ddx +pmatrix 0 & P(x) \\ Q(x) & 0 pmatrix, P,Q ∈ L2 ([0,π]), equation* considered on [0,π] with periodic and antiperiodic boundary conditions, has discrete spectra. For large enough |n|,\, n ∈ Z, there are two (counted with multiplicity) eigenvalues λn-,λn+ (periodic if n is even, or antiperiodic if n is odd) such that |λn - n |<1/2. We study the asymptotics of spectral gaps γn =λn+ - λn- in the case P(x)=a e-2ix + A e2ix, Q(x)=b e-2ix + B e2ix, where a, A, b, B are nonzero complex numbers. We show, for large enough m, that γ 2m=0 and align* γ2m+1 = 2 (Ab)m (aB)m+142m (m!)2 [ 1 + O ( 2 mm2) ], align* align* γ-(2m+1) = 2(Ab)m+1 (aB)m42m (m!)2 [ 1 + O ( 2 mm2) ]. align*