The largest fragment in self-similar fragmentation processes of positive index

Abstract

We study a self-similar fragmentation process with dislocation measure and self-similarity index α > 0. Let e-mt denote the size of the largest fragment at time t ≥ 0. For dislocation measures satisfying a regularity condition of the form (1 - s1 > δ) = δ-θ (1/δ) with θ ∈ [0,1) and slowly varying , we prove almost sure convergence \[ t ∞ (mt - g(t)) = 0, \] where g(t) = ( t - (1 - θ) t + f(t))/α, and f(t) = o( t) is a lower order correction that can be described explicitly in terms of and θ. Our results sharpen substantially the best prior result on general self-similar fragmentation processes, due to Bertoin, which states that mt = (1+o(1)) (t)/α.