Paper Info
Title
Unweighted linear congruences with distinct coordinates and the Varshamov–Tenengolts codes
Abstract
In this paper, we first give explicit formulas for the number of solutions of unweighted linear congruences with distinct coordinates. Our main tools are properties of Ramanujan sums and of the discrete Fourier transform of arithmetic functions. Then, as an application, we derive an explicit formula for the number of codewords in the Varshamov–Tenengolts code (VT_b(n)) with Hamming weight k, that is, with exactly k 1’s. The Varshamov–Tenengolts codes are an important class of codes that are capable of correcting asymmetric errors on a Z-channel. As another application, we derive Ginzburg’s formula for the number of codewords in (VT_b(n)), that is, (|VT_b(n)|). We even go further and discuss connections to several other combinatorial problems, some of which have appeared in seemingly unrelated contexts. This provides a general framework and gives new insight into all these problems which might lead to further work.
Year
DOI
Venue
2018
https://doi.org/10.1007/s10623-017-0428-3
Designs, Codes and Cryptography
Keywords
Field
DocType
Linear congruence,Distinct coordinates,Ramanujan sum,Discrete Fourier transform,The Varshamov–Tenengolts code,Hamming weight,Z,-channel,68P30,11D79,11P83,42A16
Discrete mathematics,Arithmetic function,Combinatorics,Z-channel,Ramanujan's sum,Chinese remainder theorem,Discrete Fourier transform,Hamming weight,Congruence relation,Mathematics
Journal
Volume
Issue
ISSN
86
9
0925-1022
Citations 
PageRank 
References 
0
0.34
6
Authors
3
Name
Order
Citations
PageRank
Khodakhast Bibak1136.63
Bruce M. Kapron230826.02
S. Venkatesh3537.11