Discrete Laplace and transition operators over non-Archimedean ordered fields

Abstract

We investigate properties of spectrum of normalized Laplacian L for finite graphs over non-Archimedean ordered fields. We prove a Cheeger's inequality for first non-zero eigenvalue. Then we describe properties of the operator P=I- L, which is a generalization of transition operator. We show that Cheeger estimate α1 1-h2 for the second largest eigenvalue of P is crucial for investigation of the convergence of analogue of random walk to equilibrium over a non-Archimedean ordered fields. We consider examples over the Levi-Civita field.