Author:
DEN HOLLANDER FRANK,STEIF JEFFREY E.
Abstract
We show that for translation invariant Markov random fields:
(1) the K-property implies a trivial full tail;
(2) the Bernoulli property implies Følner independence. The
existence of bilaterally deterministic Bernoulli shifts tells us
that neither result is true without the Markov assumption (even in
one dimension). We also show that for general translation
invariant random fields:
(3) Følner independence implies a trivial full tail.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Cited by
5 articles.
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