Half-plane non-coexistence without FKG

Abstract

For μ an edge percolation measure on the infinite square lattice, let μhp (respectively, μ*hp) denote its marginal (respectively, the marginal of its planar dual process) on the upper half-plane. We show that if μ is translation-invariant and ergodic and almost surely has only finitely many infinite clusters, then either almost surely μhp has no infinite cluster, or almost surely μ*hp has no infinite cluster. By the classical Burton--Keane argument, these hypotheses are satisfied if μ is translation-invariant and ergodic and has finite-energy. In contrast to previous ``non-coexistence'' theorems, our result does not impose a positive-correlation (FKG) hypothesis on μ. Our arguments also apply to the random-cluster model (including the regime q<1, which lacks FKG), the uniform spanning tree, and the uniform odd subgraph.