%0 Journal Article
%T Almost indiscernible sequences and convergence of canonical bases
%A Ita£¿ Ben Yaacov
%A Alexander Berenstein
%A C. Ward Henson
%J Mathematics
%D 2009
%I arXiv
%X We give a model-theoretic account for several results regarding sequences of random variables appearing in Berkes & Rosenthal \cite{Berkes-Rosenthal:AlmostExchangeableSequences}. In order to do this, {itemize} We study and compare three notions of convergence of types in a stable theory: logic convergence, i.e., formula by formula, metric convergence (both already well studied) and convergence of canonical bases. In particular, we characterise $\aleph_0$-categorical stable theories in which the last two agree. We characterise sequences which admit almost indiscernible sub-sequences. We apply these tools to $ARV$, the theory (atomless) random variable spaces. We characterise types and notions of convergence of types as conditional distributions and weak/strong convergence thereof, and obtain, among other things, the Main Theorem of Berkes & Rosenthal. {itemize}
%U http://arxiv.org/abs/0907.4508v2