Quadratic residues and a new infinity of orders for which a conjecture of Ryser about Circulant Hadamard matrices holds

Abstract

For every positive integer k such that k>1, there are an infinity of odd integers h with ω(h) =k distinct prime divisors such that there do not exist a Circulant Hadamard matrix H of order n=4h2. Moreover, our main result implies that for all of the odd numbers h, with 1< h < 1013 there is no Circulant Hadamard matrix of order n=4h2.