An application of Sparre Andersen's fluctuation theorem for exchangeable and sign-invariant random variables

Abstract

We revisit here a famous result by Sparre Andersen on persistence probabilities P(Sk>0 \;∀\, 0≤ k≤ n) for symmetric random walks (Sn)n≥ 0. We give a short proof of this result when considering sums of random variables that are only assumed exchangeable and sign-invariant. We then apply this result to the study of persistence probabilities of (symmetric) additive functionals of Markov chains, which can be seen as a natural generalization of integrated random walks.