Mathematics – Probability
Scientific paper
2007-04-25
Ergodic Theory and Dynamical Systems 28, 5 (2008) 1545-1557
Mathematics
Probability
Dedicated to the memory of Professor Jos\'e de Sam Lazaro
Scientific paper
10.1017/S0143385707000958
We introduce a special class of pairwise-independent self-joinings for a stationary process: Those for which one coordinate is a continuous function of the two others. We investigate which properties on the process the existence of such a joining entails. In particular, we prove that if the process is aperiodic, then it has positive entropy. Our other results suggest that such pairwise independent, non-independent self-joinings exist only in very specific situations: Essentially when the process is a subshift of finite type topologically conjugate to a full-shift. This provides an argument in favor of the conjecture that 2-fold mixing implies 3-fold-mixing.
Janvresse Élise
La Rue Thierry de
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