Random continued fractions with beta hypergeometric distribution
Probability
2010-04-09 v1
Abstract
In a recent paper (Asci \textit{et al.}, 2008) it has been shown that certain random continued fractions have a density which is a product of a beta density and a hypergeometric function . In the present paper we fully exploit a formula due to Thomae (1879) in order to generalize substantially the class of random continuous fractions with a density of the above form. This involves the design of seven particular graphs. Infinite paths on them lead to random continued fractions with an explicit distribution. A careful study about the set of five real parameters leading to a beta-hypergeometric distribution is required, relying on almost forgotten results mainly due to Felix Klein.
Cite
@article{arxiv.1004.1192,
title = {Random continued fractions with beta hypergeometric distribution},
author = {Gérard Letac and Mauro Piccioni},
journal= {arXiv preprint arXiv:1004.1192},
year = {2010}
}
Comments
28 pages, 11 figures.