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Uniqueness of the generalized Barker sequence of length 6

✍ Scribed by Zhang, N.; Golomb, S.W.

Book ID
114540671
Publisher
IEEE
Year
1990
Tongue
English
Weight
376 KB
Volume
36
Category
Article
ISSN
0018-9448

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## Abstract Binary Golay sequence pairs exist for lengths 2, 10 and 26 and, by Turyn's product construction, for all lengths of the form 2^__a__^10^__b__^26^__c__^ where __a, b, c__ are non‐negative integers. Computer search has shown that all inequivalent binary Golay sequence pairs of length less

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A Barker sequence is a sequence with elements +1 such that all out-of-phase aperiodic autocorrelation coefficients are 0, 1 or -1. It is known that ifa Barker sequence of length s > 13 exists then s = 4N 2 for some odd integer N \_> 55, and it has long been conjectured that no such sequence exists.