How big is the minimum of a branching random walk?

Abstract

Let Mn be the minimal position at generation n, of a real-valued branching random walk in the boundary case. As n ∞, Mn- 3 2 n is tight (see [1][9][2]). We establish here a law of iterated logarithm for the upper limits of Mn: upon the system's non-extinction, \n ∞ 1 n ( Mn - 32 n) = 1 almost surely. We also study the problem of moderate deviations of Mn: p(Mn- 3 2 n > λ) for λ ∞ and λ=o( n). This problem is closely related to the small deviations of a class of Mandelbrot's cascades.