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Shalom Eliahou, <a href="http://images.math.cnrs.fr/Connait-on-toutes-les-paires-de-Golay.html">Connaît-on toutes les paires de Golay ?</a>, Images des Mathématiques, CNRS, 2023. In French.
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P. B. Borwein and R. A. Ferguson, A complete description of Golay pairs for lengths up to 100, Mathematics of Computation 73 (2003) 967-985.
DP. ZB. Dokovic, IBorwein and R. Kotsireas et alA., Ferguson, <a href="http://arxivdx.doi.org/abs/140510.73281090/S0025-5718-03-01576-X">Charm bracelets and their application to the construction A complete description of periodic Golay pairs for lengths up to 100</a>, arXiv:1405.7328, 2014Mathematics of Computation 73 (2003) 967-985.
D. Z. Dokovic, I. Kotsireas et al., <a href="http://arxiv.org/abs/1405.7328">Charm bracelets and their application to the construction of periodic Golay pairs</a>, arXiv:1405.7328 [math.CO], 2014-2015.
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D. Z. Dokovic, I. Kotsireas et al., <a href="http://arxiv.org/abs/1405.7328">Charm bracelets and their application to the construction of periodic Golay pairs</a>, arXiv:1405.7328, 2014.
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106 is the first length for which the question of existence is open. - _William P. Orrick (worrick(AT)indiana.edu), _, Mar 24 2005
More terms from _William P. Orrick (worrick(AT)indiana.edu), _, Mar 24 2005