Limiting behavior of largest entry of random tensor constructed by high-dimensional data

Abstract

Let Xk=(xk1, ·s, xkp)', k=1,·s,n, be a random sample of size n coming from a p-dimensional population. For a fixed integer m≥ 2, consider a hypercubic random tensor T of m-th order and rank n with eqnarray* T= Σk=1nXk·s Xkm~multiple=(Σk=1n xki1xki2·s xkim)1≤ i1,·s, im≤ p. eqnarray* Let Wn be the largest off-diagonal entry of T. We derive the asymptotic distribution of Wn under a suitable normalization for two cases. They are the ultra-high dimension case with p∞ and p=o(nβ) and the high-dimension case with p ∞ and p=O(nα) where α,β>0. The normalizing constant of Wn depends on m and the limiting distribution of Wn is a Gumbel-type distribution involved with parameter m.