Abstract
In this paper, a recent bound on some Weil-type exponential sums over Galois rings is used in the construction of codes and sequences. The bound on these type of exponential sums provides a lower bound for the minimum distance of a family of codes over \({\mathbb F}_{p}\), mostly nonlinear, of length p m + 1 and size \(p^{2} \cdot p^{m(D-\lfloor \frac {D}{p^{2}}\rceil)}\), where 1 ≤ D ≤ p m/2. Several families of pairwise cyclically distinct p-ary sequences of period p(p m – 1) of low correlation are also constructed. They compare favorably with certain known p-ary sequences of period p m – 1. Even in the case p = 2, one of these families is slightly larger than the family Q(D) of [H-K, Section 8.8], while they share the same period and the same bound for the maximum non-trivial correlation.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
Carlet, C.: \({\mathbb Z}_{2^k}\)-linear codes. IEEE Trans. Inform. Theory 44(4), 1543–1547 (1998)
Constantinescu, I., Heise, T.: A metric for codes over residue class rings of integers. Prob. Inform. Transmission 33, 208–213
Greferath, M., Schmidt, S.E.: Gray isometries for finite chain rings and a nonlinear ternary (36,312,15) code. IEEE Trans. Inform. Theory 45(7), 2522–2524 (1999)
Helleseth, T., Kumar, P.V.: Sequences with low correlation. In: Pless, V.S., Huffman, W.C. (eds.) Handbook of Coding theory Vol. I, II, pp. 1765–1853. North-Holland, Amsterdam (1998)
Kumar, P.V., Helleseth, T., Calderbank, A.R.: An upper bound for Weil exponential sums over Galois rings with applications. IEEE Trans. Inform. Theory 41(2), 456–468 (1995)
Helleseth, T., Kumar, P.V., Moreno, O., Shanbhag, A.G.: Improved estimates via exponential sums for the minimum distance of \({\mathbb Z}_4\)-linear trace codes. IEEE Trans. Inform. Theory 42(4), 1212–1216 (1996)
Ling, S., Blackford, J.T.: \({\mathbb Z}_{p^{k+1}}\)-linear codes. IEEE Trans. Inform. Theory 48(9), 2592–2605 (2002)
Ling, S., Özbudak, F.: An Improvement on the bounds of Weil exponential sums over Galois rings with some application. IEEE Trans. Inform. Theory 50(10), 2529–2539 (2004)
Ling, S., Özbudak, F.: Improved p-ary codes and sequence families from Galois rings of characteristic p2 (2004) (submitted)
Ling, S., Solé, P.: Nonlinear p-ary sequences. Appl. Alg. Eng. Comm. Comp. 14, 117–125 (2003)
Nechaev, A.A.: The Kerdock code in a cyclic form. Discr. Math. Appl. 1, 365–384 (1991)
Shanbhag, A.G., Kumar, P.V., Helleseth, T.: Improved binary codes and sequence families from \({\mathbb Z}_4\)-linear codes. IEEE Trans. Inform. Theory 42(5), 1582–1587 (1996)
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2005 Springer-Verlag Berlin Heidelberg
About this paper
Cite this paper
Ling, S., Özbudak, F. (2005). Improved p-ary Codes and Sequence Families from Galois Rings. In: Helleseth, T., Sarwate, D., Song, HY., Yang, K. (eds) Sequences and Their Applications - SETA 2004. SETA 2004. Lecture Notes in Computer Science, vol 3486. Springer, Berlin, Heidelberg. https://doi.org/10.1007/11423461_16
Download citation
DOI: https://doi.org/10.1007/11423461_16
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-26084-4
Online ISBN: 978-3-540-32048-7
eBook Packages: Computer ScienceComputer Science (R0)