Minimal Positions in a Branching Random Walk

We consider a branching random walk on the real line, with mean family size greater than 1. Let Bn denote the minimal position of a member of the nth generation. It is known that (under a weak condition) there is a finite constant ., defined in terms of the distributions specifying the process, such that as n.., we have Bn=.n+o(n) a.s. on the event S of ultimate survival. Our results here show that (under appropriate conditions), on S the random variable Bn is strongly concentrated and the o(n) error term may be replaced by O(logn).