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Measurable events indexed by trees

Published 12 May 2011 in math.CO | (1105.2417v2)

Abstract: A tree $T$ is said to be homogeneous if it is uniquely rooted and there exists an integer $b\geq 2$, called the branching number of $T$, such that every $t\in T$ has exactly $b$ immediate successors. We study the behavior of measurable events in probability spaces indexed by homogeneous trees. Precisely, we show that for every integer $b\geq 2$ and every integer $n\geq 1$ there exists an integer $q(b,n)$ with the following property. If $T$ is a homogeneous tree with branching number $b$ and ${A_t:t\in T}$ is a family of measurable events in a probability space $(\Omega,\Sigma,\mu)$ satisfying $\mu(A_t)\geq\epsilon>0$ for every $t\in T$, then for every $0<\theta<\epsilon$ there exists a strong subtree $S$ of $T$ of infinite height such that for every non-empty finite subset $F$ of $S$ of cardinality $n$ we have [ \mu\Big(\bigcap_{t\in F} A_t\Big) \meg \theta{q(b,n)}. ] In fact, we can take $q(b,n)= \big((2b-1){2n-1}-1\big)\cdot(2b-2){-1}$. A finite version of this result is also obtained.

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