X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/canny.git/blobdiff_plain/3cb99fa4936f62fef8a0f24880e7d9bca9c31a9e..61de4335f6359f8706beacfc10912a70d02e90d2:/ourapproach.tex diff --git a/ourapproach.tex b/ourapproach.tex index 3319b6a..b49c449 100644 --- a/ourapproach.tex +++ b/ourapproach.tex @@ -1,6 +1,6 @@ The flowcharts given in Fig.~\ref{fig:sch} summarize our steganography scheme denoted by STABYLO, which stands for STeganography with cAnny, Bbs, binarY embedding at LOw cost. -What follows successively details all the inner steps and flows inside +What follows are successively details of the inner steps and flows inside both the embedding stage (Fig.~\ref{fig:sch:emb}) and the extraction one (Fig.~\ref{fig:sch:ext}). @@ -10,8 +10,8 @@ and the extraction one (Fig.~\ref{fig:sch:ext}). \subfloat[Data Embedding.]{ \begin{minipage}{0.49\textwidth} \begin{center} - \includegraphics[width=5cm]{emb.pdf} - %\includegraphics[width=5cm]{emb.ps} + %\includegraphics[width=5cm]{emb.pdf} + \includegraphics[width=5cm]{emb.ps} \end{center} \end{minipage} \label{fig:sch:emb} @@ -19,8 +19,8 @@ and the extraction one (Fig.~\ref{fig:sch:ext}). \subfloat[Data Extraction.]{ \begin{minipage}{0.49\textwidth} \begin{center} - \includegraphics[width=5cm]{rec.pdf} - %\includegraphics[width=5cm]{rec.ps} + %\includegraphics[width=5cm]{rec.pdf} + \includegraphics[width=5cm]{rec.ps} \end{center} \end{minipage} \label{fig:sch:ext} @@ -56,12 +56,12 @@ how they modify them. Many techniques have been proposed in the literature to detect edges in images (whose noise has been initially reduced). They can be separated in two categories: first and second order detection -methods on the one hand, and fuzzy detectors in the second hand~\cite{KF11}. +methods on the one hand, and fuzzy detectors on the other hand~\cite{KF11}. In first order methods like Sobel, a first-order derivative (gradient magnitude, etc.) is computed to search for local maxima, whereas in second order ones, zero crossings in a second-order derivative, like the Laplacian computed from the image, are searched in order to find edges. -For fuzzy edge methods, they are obviously based on fuzzy logic to highlight +As for as fuzzy edge methods are concerned, they are obviously based on fuzzy logic to highlight edges. Canny filters, on their parts, are an old family of algorithms still remaining a state-of-the-art edge detector. They can be well approximated by first-order derivatives of Gaussians. %% @@ -72,11 +72,11 @@ Canny filters, on their parts, are an old family of algorithms still remaining a %accurate idea on what would produce such algorithm compared to another. %That is %why we have chosen -As Canny algorithm is well known and studied, fast, and implementable +As the Canny algorithm is well known and studied, fast, and implementable on many kinds of architectures like FPGAs, smartphones, desktop machines, and GPUs, we have chosen this edge detector for illustrative purpose. Of course, other detectors like the fuzzy edge methods -merit much further attention, which is why we intend +deserve much further attention, which is why we intend to investigate systematically all of these detectors in our next work. %we do not pretend that this is the best solution. @@ -128,7 +128,7 @@ we implement the Blum-Goldwasser cryptosystem~\cite{Blum:1985:EPP:19478.19501} that is based on the Blum Blum Shub~\cite{DBLP:conf/crypto/ShubBB82} pseudorandom number generator (PRNG) for security reasons. It has been indeed proven~\cite{DBLP:conf/crypto/ShubBB82} that this PRNG -has the cryptographically security property, \textit{i.e.}, +has the property of cryptographical security, \textit{i.e.}, for any sequence of $L$ output bits $x_i$, $x_{i+1}$, \ldots, $x_{i+L-1}$, there is no algorithm, whose time complexity is polynomial in $L$, and which allows to find $x_{i-1}$ and $x_{i+L}$ with a probability greater @@ -167,7 +167,7 @@ polynomial time. \subsection{Data Extraction} -Message extraction summarized in Fig.~\ref{fig:sch:ext} follows data embedding +The message extraction summarized in Fig.~\ref{fig:sch:ext} follows data embedding since there exists a reverse function for all its steps. First of all, the same edge detection is applied (on the 7 first bits) to get the set of LSBs,