Proof of geometric Borg's Theorem in arbitrary dimensions

Abstract

Let +V be the discrete Schr\"odinger operator, where is the discrete Laplacian on Zd and potential V:Zd C is -periodic with =q1Z q2 Z·s qdZ. In this study, we establish a comprehensive characterization of complex-valued -periodic functions such that the Bloch variety of +V contains a graph of an entire function, in particular, we show that there are exactly q1q2·s qd such functions (up to Floquet isospectrality and translation). Moreover, by applying this understanding to real-valued functions V, we prove that V is constant if and only if the Bloch variety of +V contains a graph of an entire function, which confirms the conjecture concerning the geometric version of Borg's theorem in arbitrary dimensions.