Modulus of continuity eigenvalue bounds for homogeneous graphs and convex subgraphs with applications to quantum Hamiltonians

TitleModulus of continuity eigenvalue bounds for homogeneous graphs and convex subgraphs with applications to quantum Hamiltonians
Publication TypeJournal Article
Year of Publication2017
AuthorsJarret, M, Jordan, SP
JournalJournal of Mathematical Analysis and Applications
Volume452
Issue2
Pages1269-1290
Date Published2017/03/03
Abstract

We adapt modulus of continuity estimates to the study of spectra of combinatorial graph Laplacians, as well as the Dirichlet spectra of certain weighted Laplacians. The latter case is equivalent to stoquastic Hamiltonians and is of current interest in both condensed matter physics and quantum computing. In particular, we introduce a new technique which bounds the spectral gap of such Laplacians (Hamiltonians) by studying the limiting behavior of the oscillations of their eigenvectors when introduced into the heat equation. Our approach is based on recent advances in the PDE literature, which include a proof of the fundamental gap theorem by Andrews and Clutterbuck.

URLhttp://www.sciencedirect.com/science/article/pii/S0022247X1730272X
DOI10.1016/j.jmaa.2017.03.030