A search for Hadamard matrices of Williamson type
Abstract
In this article, we consider a special class of Williamson type matrices which we call them near Williamson matrices. They are in fact four n× n (-1, 1)-matrices A, B, C, D so that A is circulant, B,C,D are symmetric circulant, and they satisfy AA+BB+CC+DD=4nI. Using a computer search, we find all inequivalent near Williamson matrices for all odd orders at most 35. We also show that such matrices exist for all odd orders up to 63. As a consequence, we find the first known example of a quaternary Hadamard matrix of order 118.
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