Divergence of spectral decompositions of Hill operators with two exponential term potentials

Abstract

We consider the Hill operator Ly = - y + v(x)y, 0 ≤ x ≤ π, subject to periodic or antiperiodic boundary conditions (bc) with potentials of the form v(x) = a e-2irx + b e2isx, a, b ≠ 0, r,s ∈ N, r≠ s. It is shown that the system of root functions does not contain a basis in L2 ([0,π], C) if bc are periodic or if bc are antiperiodic and r, s are odd or r=1 and s ≥ 3.