A multi-dimensional approach to the construction and enumeration of Golay complementary sequences
Journal of Combinatorial Theory Series A
New QAM golay complementary pairs with unequal sequence power
ISIT'09 Proceedings of the 2009 IEEE international conference on Symposium on Information Theory - Volume 1
New 64-QAM Golay complementary sequences
IEEE Transactions on Information Theory
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
A construction of OFDM 16-QAM sequences having low peak powers
IEEE Transactions on Information Theory
A new construction of 16-QAM Golay complementary sequences
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory
A new construction of 64-QAM golay complementary sequences
IEEE Transactions on Information Theory
On cosets of the generalized first-order reed-muller code with low PMEPR
IEEE Transactions on Information Theory
How Do More Golay Sequences Arise?
IEEE Transactions on Information Theory
A Framework for the Construction ofGolay Sequences
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory
New QAM golay complementary pairs with unequal sequence power
ISIT'09 Proceedings of the 2009 IEEE international conference on Symposium on Information Theory - Volume 1
New 64-QAM Golay complementary sequences
IEEE Transactions on Information Theory
Paraunitary generation/correlation of QAM complementary sequence pairs
Cryptography and Communications
| Hi-index | 754.90 |
A construction of general quadrature amplitude modulation (QAM) Golay complementary sequences based on quadrature phase shift keying Golay-Davis-Jedwab sequences (GDJ sequences) is described. Existing constructions of 16- and 64-QAM Golay sequences are extended to 4q -QAM sequences of length 2m, for q ≥ 1, m ≥ 2. This construction gives [(m + 1)42(q-1) - (m + 1)4(q-1) + 2(q-1)] (m!/2)4(m+1) Golay complementary sequences. A previous offset pair enumeration conjecture for 64-QAM Golay sequences is proved as a special case of the enumeration for 4q -QAM Golay sequences. When used for orthogonal frequency-division multiplexing signals, the peak-to-mean envelope power ratio upper bound is shown to be 6(2q - 1)/(2q + 1), approaching 6 as the QAM constellation size increases.