Fermi isospectrality of discrete periodic Schr\"odinger operators with separable potentials on Z2

Abstract

Let =q1Z q2 Z with q1∈ Z+ and q2∈Z+. Let +X be the discrete periodic Schr\"odinger operator on Z2, where is the discrete Laplacian and X:Z2 C is -periodic. In this paper, we develop tools from complex analysis to study the isospectrality of discrete periodic Schr\"odinger operators. We prove that if two -periodic potentials X and Y are Fermi isospectral and both X=X1 X2 and Y= Y1 Y2 are separable functions, then, up to a constant, one dimensional potentials Xj and Yj are Floquet isospectral, j=1,2. This allows us to prove that for any non-constant separable real-valued -periodic potential, the Fermi variety Fλ(V)/Z2 is irreducible for any λ∈ C, which partially confirms a conjecture of Gieseker, Kn\"orrer and Trubowitz in the early 1990s.