Talk:Binary Goppa code

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Latest comment: 6 years ago2 comments2 people in discussion

The parity check matrix ${\displaystyle H}$  is in the form ${\displaystyle H=VD}$ . As currently written in the Wiki, matrix ${\displaystyle V}$  is ${\displaystyle (t+1)\times n}$ , and ${\displaystyle D}$  is ${\displaystyle n\times n}$ . Therefore, ${\displaystyle H}$  must be ${\displaystyle (t+1)\times n}$ , whereas the text mentions that ${\displaystyle H}$  is a ${\displaystyle t}$ -by-${\displaystyle n}$  matrix. I believe matrix ${\displaystyle V}$  must be corrected. MSDousti (talk) 20:02, 16 July 2013 (UTC)Reply

I have corrected the matrix by changing the highest powers from incorrect ${\displaystyle t}$  to correct ${\displaystyle t-1}$ . Stefkar (talk) 18:39, 15 February 2018 (UTC)Reply

Misleading use of ${\displaystyle \mathbb {Z} _{n}}$

Please change the line

${\displaystyle \forall i,j\in \mathbb {Z} _{n}:L_{i}\in GF(2^{m})\land L_{i}\neq L_{j}\land g(L_{i})\neq 0}$ 

into

${\displaystyle \forall i,j\in \lbrace 1,...,n\rbrace :L_{i}\in GF(2^{m})\land L_{i}\neq L_{j}\land g(L_{i})\neq 0}$ 

In the latter ${\displaystyle i,j}$  are just indizes running from ${\displaystyle 1}$  through ${\displaystyle n}$ , in the former they are elements of the coset ring ${\displaystyle \mathbb {Z} _{n}=\mathbb {Z} /n\mathbb {Z} }$ , which has a lot more algebraic structure. (Addtion, multiplication and ${\displaystyle x=x+kn}$ .) It was taking me nearly 15 minutes wondering what the purpose of the coset ring is and how it is related to ${\displaystyle n}$  before I understood that ${\displaystyle \mathbb {Z} _{n}}$  is meant to be an ugly short form for ${\displaystyle \lbrace 1,...,n\rbrace }$ 

Goppa Codes in Niederreiter's cryptosystem?

Latest comment: 4 years ago2 comments2 people in discussion

The text currently states: ... the binary Goppa codes are used in several post-quantum cryptosystems, notably McEliece cryptosystem and Niederreiter cryptosystem.

However, the Niederreiter cryptosystem proposed using Generalized Reed-Solomon (GRS) codes instead of Goppa codes in an attempt to make his cryptosystem more efficient and practical compared to McEliece's cryptosystem. - Markovisch (talk) 19:58, 19 April 2017 (UTC)Reply

Hello! The GRS Niederreiter is certainly "faster" but it was broken by Sidelnikov&Shestakov (see ^[1]). As far as I know, binary Goppa codes and MDPCs are now the "simplest" codes useful in Niederreiter. Also see the thesis of Weger (2017) ^[2] 212.79.106.136 (talk) 08:57, 3 December 2019 (UTC)Reply

References

1. V. Sidelnikov, S. Shestakov. On Insecurity of Cryptosystems based on Gen-eralized Reed-Solomon Codes.Discrete Math Appl., volume 2. Pages: 439-444, 1992
2. Weger, Violetta (2017). A Code-Based Cryptosystem using GRS codes. University of Zurich, Institute of Mathematics (master thesis). https://user.math.uzh.ch/rosenthal/masterthesis/11720935/Weger_2017.pdf