Self-adjoint extensions of network Laplacians and applications to resistance metrics

Abstract

Let (G,c) be an infinite network, and let E be the canonical energy form. Let 2 be the Laplace operator with dense domain in 2(G) and let E be the Laplace operator with dense domain in the Hilbert space HE of finite energy functions on G. It is known that 2 is essentially self-adjoint, but that E is not. In this paper, we characterize the Friedrichs extension of E in terms of 2 and show that the spectral measures of the two operators are mutually absolutely continuous with Radon-Nikodym derivative λ (the spectral parameter), in the complement of λ=0. We also give applications to the effective resistance on (G,c). For transient networks, the Dirac measure at λ = 0 contributes to the spectral resolution of the Friedrichs extension of E but not to that of the self-adjoint 2 Laplacian.