Space-time boundaries for random walks and their application to operator algebras

Abstract

We investigate the Martin boundary of the space-time Markov chain associated to a finitely supported random walk (, μ) with spectral radius and relate it to several classical compactifications of . Assuming the strong ratio-limit property, we prove that the reduced ratio-limit compactification embeds naturally into the space-time Martin boundary. We introduce the 0-Martin boundary, which governs the behaviour of ∞-harmonic functions, and show that the 0-Martin kernels arise as rescaled limits of λ-Martin kernels as λ→ 0. For symmetric random walks on hyperbolic groups, the 0-Martin boundary naturally covers the Gromov boundary, while the cover need not be injective in general. Our main structural theorem identifies the minimal space-time Martin boundary with the disjoint union of minimal λ-Martin boundaries over λ∈ [0, -1] with its natural pointwise topology. As an application, we show that the noncommutative Shilov boundary of the tensor algebra of the random walk (, μ) coincides with its Toeplitz C*-algebra.

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