Freely Independent Coin Tosses, Standard Young Tableaux, and the Kesten--McKay Law
Abstract
In this article, we shall start with a closed walk on a regular tree of degree d. These walks are described by the Kesten-McKay law which arises as the asymptotic distribution of a random d-regular graph on n vertices. We will show that the moments of the Kesten-McKay law are given by counting standard Young tableaux with at most 2 rows, and how some properties of the walk make sense even when d is not an integer. We will use free probability to instruct us how to build an explicit model in random matrix theory.
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