Cited By
View all- Chakraborty HMiezaki TOura M(2022)Weight enumerators, intersection enumerators and Jacobi polynomials IIDiscrete Mathematics10.1016/j.disc.2022.113098345:12Online publication date: 1-Dec-2022
Variants of Jacobi polynomials in coding theory
Pages 2583 - 2597
Abstract
In this paper, we introduce the notion of the complete joint Jacobi polynomial of two linear codes of length n over and . We give the MacWilliams type identity for the complete joint Jacobi polynomials of codes. We also introduce the concepts of the average Jacobi polynomial and the average complete joint Jacobi polynomial over and . We give a representation of the average of the complete joint Jacobi polynomials of two linear codes of length n over and in terms of the compositions of n and its distribution in the codes. Further we present a generalization of the representation for the average of the -fold complete joint Jacobi polynomials of codes over and . Finally, we give the notion of the average Jacobi intersection number of two codes.
References
[1]
Bonnecaze A, Mourrain B, and Solé P Jacobi polynomials, Type II codes, and designs Des. Codes Cryptogr. 1999 16 215-234
[2]
Chakraborty HS and Miezaki T Average complete joint weight enumerators and self-dual codes Des. Codes Cryptogr. 2021 89 6 1241-1254
[3]
Chakraborty H.S., Miezaki T., Oura M.: On the cycle index and the weight enumerator II, submitted.
[4]
Dougherty ST Algebraic Coding Theory Over Finite Commutative Rings 2017 Cham SpringerBriefs in Mathematics. Springer
[5]
Dougherty ST, Harada M, and Oura M Note on the -fold joint weight enumerators of self-dual codes over Appl. Algebra Eng. Commun. Comput. 2001 11 437-445
[6]
Honma K, Okabe T, and Oura M Weight enumerator, intersection enumerator and Jacobi polynomial Discret. Math. 2020 343 6 111815
[7]
MacWilliams FJ, Mallows CL, and Sloane NJA Generalizations of Gleason’s theorem on weight enumerators of self-dual codes IEEE Trans. Inf. Theory 1972 18 794-805
[8]
Miezaki T and Oura M On the cycle index and the weight enumerator Des. Codes Cryptogr. 2019 87 6 1237-1242
[9]
Ozeki M On the notion of Jacobi polynomials for codes Math. Proc. Camb. Philos. Soc. 1997 121 1 15-30
[10]
Yoshida T The average of joint weight enumerators Hokkaido Math. J. 1989 18 217-222
[11]
Yoshida T The average intersection number of a pair of self-dual codes Hokkaido Math. J. 1991 20 539-548
Index Terms
- Variants of Jacobi polynomials in coding theory
Index terms have been assigned to the content through auto-classification.
Recommendations
An integral formula for generalized Gegenbauer polynomials and Jacobi polynomials
The generalized Gegenbauer polynomials are orthogonal polynomials with respect to the weight function |x|^2^@m(1-x^2)^@l^-^1^/^2. An integral formula for these polynomials is proved, which serves as a transformation between h-harmonic polynomials ...
Exceptional Hahn and Jacobi orthogonal polynomials
Using Casorati determinants of Hahn polynomials ( h n α , β , N ) n , we construct for each pair F = ( F 1 , F 2 ) of finite sets of positive integers polynomials h n α , β , N ; F , n ź ź F , which are eigenfunctions of a second order difference ...
Asymptotic behavior of varying discrete Jacobi-Sobolev orthogonal polynomials
In this contribution we deal with a varying discrete Sobolev inner product involving the Jacobi weight. Our aim is to study the asymptotic properties of the corresponding orthogonal polynomials and the behavior of their zeros. We are interested in ...
Comments
Please enable JavaScript to view thecomments powered by Disqus.Information & Contributors
Information
Published In
© The Author(s), under exclusive licence to Springer Science+Business Media, LLC, part of Springer Nature 2021.
Publisher
Kluwer Academic Publishers
United States
Publication History
Published: 01 November 2022
Accepted: 07 August 2021
Revision received: 11 July 2021
Received: 12 February 2021
Author Tags
Author Tags
Qualifiers
- Research-article
Funding Sources
Contributors
Other Metrics
Bibliometrics & Citations
Bibliometrics
Article Metrics
- View Citations1Total Citations
- 0Total Downloads
- Downloads (Last 12 months)0
- Downloads (Last 6 weeks)0
Reflects downloads up to 08 Dec 2024
Other Metrics
Citations
Cited By
View all- Chakraborty HMiezaki TOura M(2022)Weight enumerators, intersection enumerators and Jacobi polynomials IIDiscrete Mathematics10.1016/j.disc.2022.113098345:12Online publication date: 1-Dec-2022
View Options
View options
Login options
Check if you have access through your login credentials or your institution to get full access on this article.
Sign in