Abstract
Unit time-phase signal sets have many important applications in radar or sonar systems. Upper bounds or lower bounds on the maximum cross ambiguity amplitudes of \((n, M)\) unit time-phase signal sets with \(M \ge 2\) have been presented in the literature. In this paper, we use Gauss sums to determine the explicit maximum cross ambiguity amplitudes of some infinite series of unit time-phase signal sets which were constructed by Ding et al. (Cryptogr Commun 5:209–227, 2013).
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Ding, C.: Complex codebooks from combinatorial designs. IEEE Trans. Inf. Theory 52(9), 4229–4235 (2006)
Ding, C., Feng, K., Feng, R., Xiong, M., Zhang, A.: Unit time-phase signal sets: Bounds and constructions. Cryptogr. Commun. 5, 209–227 (2013)
Ding, C., Feng, T.: A generic construction of complex codebooks meeting the Welch bound. IEEE Trans. Inf. Theory 53(11), 4245–4250 (2007)
Ding, C., Feng, T.: Codebooks from almost difference sets. Des. Codes Cryptogr. 46, 113–126 (2008)
Ding, C., Yin, J.: Signal sets from functions with optimum nonlinearity. IEEE Trans. Commun. 55(5), 936–940 (2007)
Feng, K.: Algebraic Number Theory (in Chinese). Science Press, Beijing (2000)
Gurevich, S., Hadani, R., Sochen, N.: The finite harmonic oscillator and its applications to sequences, communication and radar. IEEE Trans. Inf. Theory 54(9), 4239–4253 (2008)
Hu, L., Yue, Q.: Gauss periods and codebooks from generalized cyclotomic sets of order four. Des. Codes Cryptogr. 69, 233–246 (2013)
Ireland, K., Rosen, M.: A Classical Introduction to Modern Number Theory, 2nd edn, GTM 84. Springer, New York (1990)
Lidl, R., Niederreiter, H.: Finite Fields. Addison-Wesley, Bostan (1983)
Schmidt, K.: Sequences families with low correlation derived from multiplicative and addtive characters. IEEE Trans. Inf. Theory 57(4), 2291–2294 (2011)
Wang, Z., Gong, G.: New sequences design from Weil representation with low two-dimensional correlation in both time and phase shifts. IEEE Trans. Inf. Theory 57(7), 4600–4611 (2011)
Wang, Z., Gong, G., Yu, N.Y.: New polyphase sequence families with low correlation derived from the Weil bound of exponential sums. IEEE Trans. Inf. Theory 59(6), 3990–3998 (2013)
Yang, J., Xia, L.: Complete solving of explicit evaluation of Gauss sums in the index 2 case. Sci. China Math. 53, 2525–2542 (2010)
Zhang, A., Feng, K.: Construction of cyclotomic codebooks nearly meeting the Welch bound. Des. Codes Cryptogr. 63, 209–224 (2012)
Acknowledgments
The authors are very grateful to the two anonymous reviewers and the editor for their valuable comments and suggestions that improved the quality of this paper. The paper is supported by NNSF of China (No. 11171150) and Foundation of Science and Technology on Information Assurance Laboratory (No. KJ-13-001).
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Li, C., Yue, Q. Unit time-phase signal sets with the explicit maximum cross ambiguity amplitudes. AAECC 25, 393–405 (2014). https://doi.org/10.1007/s00200-014-0234-3
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00200-014-0234-3
Keywords
- Unit time-phase signal sets
- Stickelberger’s Theorem
- Index 2 Gauss sums
- Maximum cross ambiguity amplitude