Unbounded containment in the energy space of a network and the Krein extension of the energy Laplacian

Abstract

We compare the space of square-summable functions on an infinite graph (denoted 2(G)) with the space of functions of finite energy (denoted HE). There is a notion of inclusion that allows 2(G) to be embedded into HE, but the required inclusion operator is unbounded in most interesting cases. These observations assist in the construction of the Krein extension of the Laplace operator on HE. We investigate the Krein extension and compare it to the Friedrichs extension developed by the authors in a previous paper.