Trivial intersection of σ-fields and Gibbs sampling

Abstract

Let (,F,P) be a probability space and N the class of those F∈F satisfying P(F)∈\0,1\. For each G⊂F, define G=σ(G N). Necessary and sufficient conditions for AB= A, where A,B⊂F are sub-σ-fields, are given. These conditions are then applied to the (two-component) Gibbs sampler. Suppose X and Y are the coordinate projections on (,F)=(X×Y, U V) where (X,U) and (Y,V) are measurable spaces. Let (Xn,Yn)n≥0 be the Gibbs chain for P. Then, the SLLN holds for (Xn,Yn) if and only if σ(X)σ(Y)=N, or equivalently if and only if P(X∈ U)P(Y∈ V)=0 whenever U∈U, V∈V and P(U× V)=P(Uc× Vc)=0. The latter condition is also equivalent to ergodicity of (Xn,Yn), on a certain subset S0⊂, in case F=U is countably generated and P absolutely continuous with respect to a product measure.