Reconstruction on Trees: Exponential Moment Bounds for Linear Estimators

Abstract

Consider a Markov chain (v)v ∈ V ∈ [k]V on the infinite b-ary tree T = (V,E) with irreducible edge transition matrix M, where b ≥ 2, k ≥ 2 and [k] = \1,...,k\. We denote by Ln the level-n vertices of T. Assume M has a real second-largest (in absolute value) eigenvalue λ with corresponding real eigenvector ≠ 0. Letting σv = _v, we consider the following root-state estimator, which was introduced by Mossel and Peres (2003) in the context of the "recontruction problem" on trees: equation* Sn = (bλ)-n Σx∈ Ln σx. equation* As noted by Mossel and Peres, when bλ2 > 1 (the so-called Kesten-Stigum reconstruction phase) the quantity Sn has uniformly bounded variance. Here, we give bounds on the moment-generating functions of Sn and Sn2 when bλ2 > 1. Our results have implications for the inference of evolutionary trees.