English

Sparse random tensors: Concentration, regularization and applications

Probability 2021-05-05 v7 Combinatorics Statistics Theory Statistics Theory

Abstract

We prove a non-asymptotic concentration inequality for the spectral norm of sparse inhomogeneous random tensors with Bernoulli entries. For an order-kk inhomogeneous random tensor TT with sparsity pmaxclognnp_{\max}\geq \frac{c\log n}{n }, we show that TET=O(npmaxlogk2(n))\|T-\mathbb E T\|=O(\sqrt{n p_{\max}}\log^{k-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 pmaxclognnmp_{\max}\geq \frac{c\log n}{n^{m}} with 1mk11\leq m\leq k-1 and obtain concentration inequalities for different sparsity regimes. We also provide a simple way to regularize TT such that O(nmpmax)O(\sqrt{n^{m}p_{\max}}) concentration still holds down to sparsity pmaxcnmp_{\max}\geq \frac{c}{n^{m}} with k/2mk1k/2\leq m\leq 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.

Keywords

Cite

@article{arxiv.1911.09063,
  title  = {Sparse random tensors: Concentration, regularization and applications},
  author = {Zhixin Zhou and Yizhe Zhu},
  journal= {arXiv preprint arXiv:1911.09063},
  year   = {2021}
}

Comments

24 pages

R2 v1 2026-06-23T12:22:35.040Z