Steganographic Codes -- a New Problem of Coding Theory
Abstract
To study how to design steganographic algorithm more efficiently, a new coding problem -- steganographic codes (abbreviated stego-codes) -- is presented in this paper. The stego-codes are defined over the field with elements. Firstly a method of constructing linear stego-codes is proposed by using the direct sum of vector subspaces. And then the problem of linear stego-codes is converted to an algebraic problem by introducing the concept of th dimension of vector space. And some bounds on the length of stego-codes are obtained, from which the maximum length embeddable (MLE) code is brought up. It is shown that there is a corresponding relation between MLE codes and perfect error-correcting codes. Furthermore the classification of all MLE codes and a lower bound on the number of binary MLE codes are obtained based on the corresponding results on perfect codes. Finally hiding redundancy is defined to value the performance of stego-codes.
Cite
@article{arxiv.cs/0505072,
title = {Steganographic Codes -- a New Problem of Coding Theory},
author = {Weiming Zhang and Shiqu Li},
journal= {arXiv preprint arXiv:cs/0505072},
year = {2009}
}
Comments
7 pages with 1 figure