Wang, Z. ., & Gong, G. . (2009). New sequences design from Weil representation with low two-dimensional correlation in both time and phase shifts. Seoul, Korea.
Reference author: Z. Wang
First name
Z.
Last name
Wang
Wang, Z. ., Gong, G. ., & Yu, N. . (2012). New polyphase sequence families with low correlation derived from the Weil bound of exponential sums. IEEE Transactions on Information Theory. (Original work published 2012)
Wang, Z. ., Parker, M. ., Gong, G. ., & Wu, G. . (2014). On the PMEPR of binary Golay sequences of length 2^n. IEEE Transactions on Information Theory, 60, 2391-2398. (Original work published 2014)
Ma, D. ., Wang, Z. ., & Gong, G. . (2018). A Direct Method to Construct Golay Complementary Sets Based on Boolean Functions. Toronto, Canada. (Original work published 2018)
Ma, D. ., Budisin, S. ., Wang, Z. ., & Gong, G. . (2018). A New Generalized Paraunitary Generator for Complementary Sets and Complete Complementary Codes of size 2m. IEEE Signal Processing Letters. (Original work published 2018)
Wang, Z. ., & Gong, G. . (2017). Discrete Fourier Transform of Boolean Functions over the Complex Field and Its Applications. IEEE Transactions on Information Theory Special Issue on Shift-Register Sequences, Codes and Cryptography in Memory of Solomon W. Golomb. (Original work published 2018)
Ma, D. ., Wang, Z. ., & Gong, G. . (2017). A New Method to Construct Golay Complementary set and Near-Complementary set by Paraunitary Matrices. Sapporo, Japan. (Original work published 2017)
Ma, D. ., Wang, Z. ., & Li, H. . (2016). A Generalized Construction of Non-Square M-QAM Sequences with Low PMEPR for OFDM Systems. IEICE Transactions, 99-A, 1222-1227. (Original work published 2016)