Boosting uniformity in quasirandom groups: fast and simple

Abstract

We study the communication complexity of multiplying k× t elements from the group H=SL(2,q) in the number-on-forehead model with k parties. We prove a lower bound of (t H)/ck. This is an exponential improvement over previous work, and matches the state-of-the-art in the area. Relatedly, we show that the convolution of kc independent copies of a 3-uniform distribution over Hm is close to a k-uniform distribution. This is again an exponential improvement over previous work which needed ck copies. The proofs are remarkably simple; the results extend to other quasirandom groups. We also show that for any group H, any distribution over Hm whose weight-k Fourier coefficients are small is close to a k-uniform distribution. This generalizes previous work in the abelian setting, and the proof is simpler.