Monotonicity of average return probabilities for random walks in random environments

Abstract

We extend a result of Lyons (2016) from fractional tiling of finite graphs to a version for infinite random graphs. The most general result is as follows. Let P be a unimodular probability measure on rooted networks (G, o) with positive weights wG on its edges and with a percolation subgraph H of G with positive weights wH on its edges. Let P(G, o) denote the conditional law of H given (G, o). Assume that α := P(G, o)[o ∈ V(H)] > 0 is a constant P-a.s. We show that if P-a.s. whenever e ∈ E(G) is adjacent to o, \[ E(G, o)[wH(e) | e ∈ E(H)] P(G, o)[e ∈ E(H) | o∈ V(H)] wG(e) \,, \] then \[ ∀ t > 0 E[pt(o; G)] E[pt(o; H) | o ∈ V(H)] \,. \]