New QAM Golay complementary pairs with unequal sequence power

A collection of new length four 16-QAM Golay complementary pairs are presented. Most of the new pairs have pairing sequences with unequal sequence power. These pairs are variations of 13 basic pairs, including ([A A A A], [A B −B −A]), where A is any complex number and B= (1+2j)A. Note that the constant sequence [A A A A] was considered not to be a Golay sequence when PSK alphabets are employed. There are 1440 length four 16-QAM new Golay sequences and 11264 new Golay pairs associated with the 13 basic pairs, in addition to the 2432 Golay sequences and 20480 Golay pairs constructed by Chong, et. al.. These new pairs can be used as primitive pairs to recursively generate longer new QAM Golay sequences and pairs. The construction of Golay pairs/sequences from variations of the basic pair ([A A A A], [A B −B −A]) is discussed. OFDM peak-to-mean envelope power ratio upper bounds for Golay sequences generated from that basic pair is 0.8 for sequence lengths n=2m, m≫1. Constructions and bounds for sequences/pairs associated with the other basic pairs can be derived in a similar manner.

[1]  J. Jedwab,et al.  A Framework for the Construction of Golay Sequences , 2008 .

[2]  Ying Li,et al.  New 64-QAM Golay Complementary Sequences , 2010, IEEE Transactions on Information Theory.

[3]  Matthew G. Parker,et al.  A multi-dimensional approach to the construction and enumeration of Golay complementary sequences , 2008, J. Comb. Theory, Ser. A.

[4]  Kai-Uwe Schmidt,et al.  On cosets of the generalized first-order reed-muller code with low PMEPR , 2006, IEEE Transactions on Information Theory.

[5]  Matthew G. Parker,et al.  A Framework for the Construction ofGolay Sequences , 2008, IEEE Transactions on Information Theory.

[6]  Solomon W. Golomb,et al.  A new construction of 64-QAM golay complementary sequences , 2006, IEEE Transactions on Information Theory.

[7]  Ying Li,et al.  More Golay sequences , 2005, IEEE Trans. Inf. Theory.

[8]  Jonathan Jedwab,et al.  How Do More Golay Sequences Arise? , 2006, IEEE Transactions on Information Theory.

[9]  C.-C. TSENG,et al.  Complementary sets of sequences , 1972, IEEE Trans. Inf. Theory.

[10]  Ying Li,et al.  Extension of Golay's two pair construction for general complex complementary sequences , 2008, 2008 International Symposium on Information Theory and Its Applications.

[11]  Ying Li A Construction of General QAM Golay Complementary Sequences , 2010, IEEE Transactions on Information Theory.

[12]  Ying Li Comments on "A New Construction of 16-QAM Golay Complementary Sequences" and Extension for 64-QAM Golay Sequences , 2008, IEEE Trans. Inf. Theory.

[13]  J. Jedwab,et al.  Peak-to-mean power control in OFDM, Golay complementary sequences and Reed-Muller codes , 1998, Proceedings. 1998 IEEE International Symposium on Information Theory (Cat. No.98CH36252).

[14]  Marcel J. E. Golay,et al.  Complementary series , 1961, IRE Trans. Inf. Theory.

[15]  Vahid Tarokh,et al.  A construction of OFDM 16-QAM sequences having low peak powers , 2001, IEEE Trans. Inf. Theory.

[16]  Vahid Tarokh,et al.  A new construction of 16-QAM Golay complementary sequences , 2003, IEEE Trans. Inf. Theory.

[17]  Ying Li,et al.  Structures of non-GDJ golay sequences , 2005, Proceedings. International Symposium on Information Theory, 2005. ISIT 2005..

[18]  Guang Gong,et al.  Signal Design for Good Correlation: For Wireless Communication, Cryptography, and Radar , 2005 .