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Equivalence of relative Gibbs and relative equilibrium measures for actions of countable amenable groups

Sebastián Barbieri, Ricardo Gómez, Brian Marcus, Siamak Taati

2020Nonlinearity31 citationsDOIOpen Access PDF

Abstract

Abstract We formulate and prove a very general relative version of the Dobrushin–Lanford–Ruelle theorem which gives conditions on constraints of configuration spaces over a finite alphabet such that for every absolutely summable relative interaction, every translation-invariant relative Gibbs measure is a relative equilibrium measure and vice versa. Neither implication is true without some assumption on the space of configurations. We note that the usual finite type condition can be relaxed to a much more general class of constraints. By ‘relative’ we mean that both the interaction and the set of allowed configurations are determined by a random environment. The result includes many special cases that are well known. We give several applications including (1) Gibbsian properties of measures that maximize pressure among all those that project to a given measure via a topological factor map from one symbolic system to another; (2) Gibbsian properties of equilibrium measures for group shifts defined on arbitrary countable amenable groups; (3) A Gibbsian characterization of equilibrium measures in terms of equilibrium condition on lattice slices rather than on finite sets; (4) A relative extension of a theorem of Meyerovitch, who proved a version of the Lanford–Ruelle theorem which shows that every equilibrium measure on an arbitrary subshift satisfies a Gibbsian property on interchangeable patterns.

Topics & Concepts

MathematicsCountable setEquivalence (formal languages)Measure (data warehouse)Gibbs measureAbsolute continuityClass (philosophy)Space (punctuation)Second-countable spaceLattice (music)Subshift of finite typeProbability measureAmenable groupPure mathematicsAdditive functionAlphabetKullback–Leibler divergenceFinite setErgodicityCompact spaceProperty (philosophy)Equivalence class (music)Thermodynamic equilibriumLocally compact spaceEquivalence relationDiscrete mathematicsCombinatoricsCharacterization (materials science)Set (abstract data type)Topological spaceσ-finite measureAlmost everywhereWeak topology (polar topology)Mathematical Dynamics and FractalsCellular Automata and ApplicationsQuasicrystal Structures and Properties