@techreport{63bcae6ba0874ce282c26e63ae1b8094,
title = "On the Approximation of finite Markov-exchangeable processes by mixtures of Markov Processes",
abstract = "We give an upper bound for the norm distance of (0,1) -valued Markov-exchangeable random variables to mixtures of distributions of Markov processes. A Markov-exchangeable random variable has a distribution that depends only on the starting value and the number of transitions 0-0, 0-1, 1-0 and 1-1. We show that if, for increasing length of variables, the norm distance to mixtures of Markov processes goes to 0, the rate of this convergence may be arbitrarily slow. (author's abstract)",
author = "Klaus P{\"o}tzelberger",
year = "1991",
doi = "10.57938/63bcae6b-a087-4ce2-82c2-6e63ae1b8094",
language = "English",
series = "Forschungsberichte / Institut f{\"u}r Statistik",
number = "10",
publisher = "Department of Statistics and Mathematics, WU Vienna University of Economics and Business",
type = "WorkingPaper",
institution = "Department of Statistics and Mathematics, WU Vienna University of Economics and Business",
}