Maximal distance travelled by N vicious walkers till their survival

Abstract

We consider N Brownian particles moving on a line starting from initial positions u \u1,u2,… uN\ such that 0<u1 < u2 < ·s < uN. Their motion gets stopped at time ts when either two of them collide or when the particle closest to the origin hits the origin for the first time. For N=2, we study the probability distribution function p1(m|u) and p2(m|u) of the maximal distance travelled by the 1st and 2nd walker till ts. For general N particles with identical diffusion constants D, we show that the probability distribution pN(m| u) of the global maximum mN, has a power law tail pi(m|u) N2BNFN( u)/mN with exponent N =N2+1. We obtain explicit expressions of the function FN( u) and of the N dependent amplitude BN which we also analyze for large N using techniques from random matrix theory. We verify our analytical results through direct numerical simulations.