Lower bounds on maximal determinants of binary matrices via the probabilistic method

Abstract

Let D(n) be the maximal determinant for n × n \ 1\-matrices, and R(n) = D(n)/nn/2 be the ratio of D(n) to the Hadamard upper bound. We give several new lower bounds on R(n) in terms of d, where n = h+d, h is the order of a Hadamard matrix, and h is maximal subject to h n. A relatively simple bound is \[ R(n) (2π e)d/2 (1 - d2(π2h)1/2) \; for all \; n 1.\] An asymptotically sharper bound is \[ R(n) (2π e)d/2 (d(π2h)1/2 + \; O(d5/3h2/3)).\] We also show that \[ R(n) (2π e)d/2\] if n n0 and n0 is sufficiently large, the threshold n0 being independent of d, or for all n 1 if 0 d 3 (which would follow from the Hadamard conjecture). The proofs depend on the probabilistic method, and generalise previous results that were restricted to the cases d=0 and d=1.