New algorithms for designing unimodular sequences with good correlation properties
IEEE Transactions on Signal Processing
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
Complementary sequences for ISI channel estimation
IEEE Transactions on Information Theory
Periodic complementary binary sequences
IEEE Transactions on Information Theory
Designing structured tight frames via an alternating projection method
IEEE Transactions on Information Theory
Complementary Sets, Generalized Reed–Muller Codes, and Power Control for OFDM
IEEE Transactions on Information Theory
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In this paper, we introduce a fast computational frequency-domain approach for designing complementary sets of sequences. Following the basic idea of CAN-based algorithms, we propose an extension of the CAN algorithm to complementary sets of sequences (which we call CANARY). Moreover, modified versions of the proposed algorithm are derived to tackle the complementary set design problems in which low peak-to-average-power ratio (PAR), unimodular or phase-quantized sequences are of interest. Several numerical examples are provided to show the performance of CANARY.