Original scientific paper
Under a mild condition, Ryser's Conjecture holds for every \( n:= 4h^2\) with h>1 odd and non square-free
Luis H. Gallardo
; Univ Brest, UMR CNRS 6 205, Laboratoire de Math´ematiques de Bretagne Atlantique, Brest, France
Abstract
We prove, under a mild condition, that there is no circulant Hadamard matrix \( H\) with \(n >4\) rows when
\(\sqrt{n/4}\) is not square-free. The proof introduces a new method to attack
Ryser's Conjecture, that is a long standing difficult conjecture.
Keywords
Circulant matrices; Hadamard matrices; Sums of roots of unity; Complex unit circle; Cyclotomic fields
Hrčak ID:
252594
URI
Publication date:
10.3.2021.
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