A new restriction on the lengths of Golay complementary sequences
Journal of Combinatorial Theory Series A
Advances in Applied Mathematics
A theory of ternary complementary pairs
Journal of Combinatorial Theory Series A
Further explorations into ternary complementary pairs
Journal of Combinatorial Theory Series A
There are no Barker arrays having more than two dimensions
Designs, Codes and Cryptography
A survey of the merit factor problem for binary sequences
SETA'04 Proceedings of the Third international conference on Sequences and Their Applications
Peak-to-mean power control in OFDM, Golay complementary sequences, and Reed-Muller codes
IEEE Transactions on Information Theory
Generalized Reed-Muller codes and power control in OFDM modulation
IEEE Transactions on Information Theory
The peak sidelobe level of families of binary sequences
IEEE Transactions on Information Theory
A multi-dimensional approach to the construction and enumeration of Golay complementary sequences
Journal of Combinatorial Theory Series A
Close Encounters with Boolean Functions of Three Different Kinds
ICMCTA '08 Proceedings of the 2nd international Castle meeting on Coding Theory and Applications
Note: A new source of seed pairs for Golay sequences of length 2m
Journal of Combinatorial Theory Series A
Quaternary Golay sequence pairs I: even length
Designs, Codes and Cryptography
On logic functions of complementary arrays of length 2n
AIC'10/BEBI'10 Proceedings of the 10th WSEAS international conference on applied informatics and communications, and 3rd WSEAS international conference on Biomedical electronics and biomedical informatics
Generalised complementary arrays
IMACC'11 Proceedings of the 13th IMA international conference on Cryptography and Coding
A complementary construction using mutually unbiased bases
Cryptography and Communications
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Constructions and nonexistence conditions for multi-dimensional Golay complementary array pairs are reviewed. A construction for a d-dimensional Golay array pair from a (d + 1)-dimensional Golay array pair is given. This is used to explain and expand previously known constructive and nonexistence results in the binary case.