English

Interleaved group products

Combinatorics 2018-04-27 v1 Computational Complexity Group Theory

Abstract

Let GG be the special linear group SL(2,q)\mathrm{SL}(2,q). We show that if (a1,,at)(a_1,\ldots,a_t) and (b1,,bt)(b_1,\ldots,b_t) are sampled uniformly from large subsets AA and BB of GtG^t then their interleaved product a1b1a2b2atbta_1 b_1 a_2 b_2 \cdots a_t b_t is nearly uniform over GG. This extends a result of the first author, which corresponds to the independent case where AA and BB are product sets. We obtain a number of other results. For example, we show that if XX is a probability distribution on GmG^m such that any two coordinates are uniform in G2G^2, then a pointwise product of ss independent copies of XX is nearly uniform in GmG^m, where ss depends on mm only. Extensions to other groups are also discussed. We obtain closely related results in communication complexity, which is the setting where some of these questions were first asked by Miles and Viola. For example, suppose party AiA_i of kk parties A1,,AkA_1,\dots,A_k receives on its forehead a tt-tuple (ai1,,ait)(a_{i1},\dots,a_{it}) of elements from GG. The parties are promised that the interleaved product a11ak1a12ak2a1takta_{11}\dots a_{k1}a_{12}\dots a_{k2}\dots a_{1t}\dots a_{kt} is equal either to the identity ee or to some other fixed element gGg\in G, and their goal is to determine which of the two the product is equal to. We show that for all fixed kk and all sufficiently large tt the communication is Ω(tlogG)\Omega(t \log |G|), which is tight. Even for k=2k=2 the previous best lower bound was Ω(t)\Omega(t). As an application, we establish the security of the leakage-resilient circuits studied by Miles and Viola in the "only computation leaks" model.

Keywords

Cite

@article{arxiv.1804.09787,
  title  = {Interleaved group products},
  author = {W. T. Gowers and Emanuele Viola},
  journal= {arXiv preprint arXiv:1804.09787},
  year   = {2018}
}

Comments

30 pages, to appear SICOMP FOCS special issue

R2 v1 2026-06-23T01:36:04.208Z