Stochastic Ordering of Infinite Geometric Galton-Watson Trees

Abstract

We consider Galton-Watson trees with Geom(p) offspring distribution. We let T∞(p) denote such a tree conditioned on being infinite. We prove that for any 1/2≤ p1 <p2 ≤ 1, there exists a coupling between T∞(p1) and T∞(p2) such that P(T∞(p1) ⊂eq T∞(p2))=1.