Sparse random tensors: Concentration, regularization and applications

Abstract

We prove a non-asymptotic concentration inequality for the spectral norm of sparse inhomogeneous random tensors with Bernoulli entries. For an order-k inhomogeneous random tensor T with sparsity p≥ c nn , we show that \|T- E T\|=O(n pk-2(n)) with high probability. The optimality of this bound up to polylog factors is provided by an information theoretic lower bound. By tensor unfolding, we extend the range of sparsity to p≥ c nnm with 1≤ m≤ k-1 and obtain concentration inequalities for different sparsity regimes. We also provide a simple way to regularize T such that O(nmp) concentration still holds down to sparsity p≥ cnm with k/2≤ m≤ k-1. We present our concentration and regularization results with two applications: (i) a randomized construction of hypergraphs of bounded degrees with good expander mixing properties, (ii) concentration of sparsified tensors under uniform sampling.