On joint returns to zero of Bessel processes

Abstract

In this article, we consider joint returns to zero of n Bessel processes (n≥ 2): our main goal is to estimate the probability that they avoid having joint returns to zero for a long time. More precisely, considering n independent Bessel processes (Xt(i))1≤ i ≤ n of dimension δ ∈ (0,1), we are interested in the first joint return to zero of any two of them: \[ Hn := ∈f\ t>0, ∃ 1≤ i <j ≤ n such that Xt(i) = Xt(j) =0 \ \,. \] We prove the existence of a persistence exponent θn such that P(Hn>t) = t-θn+o(1) as t∞, and we provide some non-trivial bounds on θn. In particular, when n=3, we show that 2(1-δ)≤ θ3 ≤ 2 (1-δ) + f(δ) for some (explicit) function f(δ) with [0,1] f(δ) ≈ 0.079.