An Approximation to Proof of the Circulant Hadamard Conjecture
Abstract
Turyn prove that if a circulant Hadamard matrix of order n exists then n must be of the form n=4m2 for some odd integer m. In this paper we use the structure constant of Schur ring of 24m2 to prove that there is no circulant Hadamard matrix in 24m2 except possibly for sequences with Hamming weight a+b, with m2-m2≤ a≤3m2-m2 and b=2m2-m-a and with m2+m2≤ 2m2-a≤3m2+m2 and b=m+a.
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