A Feyman-Kac approach to a paper of Chung and Feller on fluctuations in the coin-tossing game
Abstract
A classical result of K. L. Chung and W. Feller deals with the partial sums Sk arising in a fair coin-tossing game. If Nn is the number of "positive" terms among S1, S2,…,Sn then the quantity P(N2n=2r) takes an elegant form. We lift the restriction on an even number of tosses and give a simple expression for P(N2n+1=r), r=0,1,2,…,2n+1. We get to this result by adapting the Feynman-Kac methodology.
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