Arithmetic expanders and deviation bounds for random tensors

Abstract

We prove hypergraph variants of the celebrated Alon-Roichman theorem on spectral expansion of sparse random Cayley graphs. One of these variants implies that for every prime p≥ 3 and any > 0, there exists a set of directions D⊂eq Fpn of size Op,(p(1-1/p +o(1))n) such that for every set A⊂eq Fpn of density α, the fraction of lines in A with direction in D is within α of the fraction of all lines in A. Our proof uses new deviation bounds for sums of independent random multi-linear forms taking values in a generalization of the Birkhoff polytope. The proof of our deviation bound is based on Dudley's integral inequality and a probabilistic construction of -nets. Using the polynomial method we prove that a Cayley hypergraph with edges generated by a set~D as above requires |D| ≥ p(np-1) for (our notion of) spectral expansion for hypergraphs.