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)