Random Gaussian sums on trees

Abstract

Let T be a tree with induced partial order . We investigate centered Gaussian processes X=(Xt)t∈ T represented as Xt=σ(t)Σv tα(v)v for given weight functions α and σ on T and with (v)v∈ T i.i.d. standard normal. In a first part we treat general trees and weights and derive necessary and sufficient conditions for the a.s. boundedness of X in terms of compactness properties of (T,d). Here d is a special metric defined via α and σ, which, in general, is not comparable with the Dudley metric generated by X. In a second part we investigate the boundedness of X for the binary tree and for homogeneous weights. Assuming some mild regularity assumptions about α we completely characterize weights α and σ with X being a.s. bounded.