The Fundamental Gap for a Class of Schr\"odinger Operators on Path and Hypercube Graphs

Abstract

We consider the difference between the two lowest eigenvalues (the fundamental gap) of a Schr\"odinger operator acting on a class of graphs. In particular, we derive tight bounds for the gap of Schr\"odinger operators with convex potentials acting on the path graph. Additionally, for the hypercube graph, we derive a tight bound for the gap of Schr\"odinger operators with convex potentials dependent only upon vertex Hamming weight. Our proof makes use of tools from the literature of the fundamental gap theorem as proved in the continuum combined with techniques unique to the discrete case. We prove the tight bound for the hypercube graph as a corollary to our path graph results.