论文信息 - Multiply constant weight codes

Multiply constant weight codes

The function M(m, n, d, w), the largest size of an unrestricted binary code made of m by n arrays, with constant row weight w, and minimum distance d is introduced and compared to the classical functions of combinatorial coding theory Aq(n, d) and A(n, d, w). The analogues for systematic codes of A(n, d) and A(n, d, w) are introduced apparently for the first time. An application to the security of embedded systems is given: these codes happen to be efficient challenges for physically unclonable functions.

Sylvain Guilley | Jean-Luc Danger | Jon-Lark Kim | Patrick Solé | Zouha Cherif

[1] Richard M. Wilson,et al. On resolvable designs , 2006, Discret. Math..

[2] W. Cary Huffman,et al. Fundamentals of Error-Correcting Codes , 1975 .

[3] Mao Chao Lin. Constant Weight Codes for Correcting Symmetric Errors and Detecting Unidirectional Errors , 1993, IEEE Trans. Computers.

[4] Sylvain Guilley,et al. An Easy-to-Design PUF Based on a Single Oscillator: The Loop PUF , 2012, 2012 15th Euromicro Conference on Digital System Design.

[5] Stephen A. Benton,et al. Physical one-way functions , 2001 .

[6] T. Etzion. Optimal doubly constant weight codes , 2008 .

[7] Robert J. McEliece,et al. New upper bounds on the rate of a code via the Delsarte-MacWilliams inequalities , 1977, IEEE Trans. Inf. Theory.

[8] F. MacWilliams,et al. The Theory of Error-Correcting Codes , 1977 .

[9] Alexander Vardy,et al. Upper bounds for constant-weight codes , 2000, IEEE Trans. Inf. Theory.

[10] Selmer M. Johnson,et al. Upper bounds for constant weight error correcting codes , 1972, Discret. Math..

[11] Henk C. A. van Tilborg,et al. Constructions and bounds for systematic t EC/AUED codes , 1990, IEEE Trans. Inf. Theory.