Probabilistic lower bounds on maximal determinants of binary matrices
Abstract
Let be the maximal determinant for -matrices, and be the ratio of to the Hadamard upper bound. Using the probabilistic method, we prove new lower bounds on and in terms of , where is the order of a Hadamard matrix and is maximal subject to . For example, if , and if . By a recent result of Livinskyi, as , so the second bound is close to for large . Previous lower bounds tended to zero as with fixed, except in the cases . For , our bounds are better for all sufficiently large . If the Hadamard conjecture is true, then , so the first bound above shows that is bounded below by a positive constant .
Keywords
Cite
@article{arxiv.1501.06235,
title = {Probabilistic lower bounds on maximal determinants of binary matrices},
author = {Richard P. Brent and Judy-anne H. Osborn and Warren D. Smith},
journal= {arXiv preprint arXiv:1501.06235},
year = {2016}
}
Comments
17 pages, 2 tables, 24 references. Shorter version of arXiv:1402.6817v4. Typos corrected in v2 and v3, new Lemma 7 in v4, updated references in v5, added Remark 2.8 and a reference in v6, updated references in v7