On the Essential Spectrum of Schr\"odinger Operators on Graphs

Abstract

This work studies geometrical characterizations of the essential spectrum σ ess of Schr\"odinger operators on graphs. Especially we focus on generalizing characterizations which are given in terms of the concept of right limits. Intuitively the set of right limits of a Schr\"odinger operator H on 2(N) includes the limit operators which are obtained by a sequence of left-shifts (moving away to infinity) of H. One characterization, which is known for such operators is that σ ess(H) is equal to the union over the spectra of right limits of H. Additionally, the essential spectrum equals to the union over the sets of "eigenvalues" corresponding to bounded eigenfunctions of the right limits of H. The first characterization above (and its generalization to Zn) is essentially due to a work by Last-Simon from 2006. In this work we study the possibility of generalizing these characterizations of σess(H) to Schr\"odinger operators on graphs. The work is composed of the following chapters: Chapter 1. An overview, including the setting and the proposed generalization of the concept of right limits to general graphs. Chapter 2. On extending the original Last-Simon argument for the proof of the first characterization to graphs. We give both a partial positive result and an example of a graph on which this characterization fails. Chapter 3. A Focus on characterizing the essential spectrum on trees. Chapter 4. A study of the possible generalization of the second characterization to graphs, from which we also get the first characterization on a general family of graphs.