X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/rairo15.git/blobdiff_plain/586298b57c6e1cec5566bbe692ac21c4c701fd51..a4822f9546c111a918ccfc748828076bcfe1202a:/preliminaries.tex?ds=sidebyside diff --git a/preliminaries.tex b/preliminaries.tex index 6d837a1..1200bc5 100644 --- a/preliminaries.tex +++ b/preliminaries.tex @@ -1,167 +1,101 @@ - - - In what follows, we consider the Boolean algebra on the set $\Bool=\{0,1\}$ with the classical operators of conjunction '.', of disjunction '+', of negation '$\overline{~}$', and of disjunctive union $\oplus$. -Let $n$ be a positive integer. A {\emph{Boolean map} $f$ is -a function from the Boolean domain - to itself +Let us first introduce basic notations. +Let $\mathsf{N}$ be a positive integer. The set $\{1, 2, \hdots , \mathsf{N}\}$ +of integers belonging between $1$ and $\mathsf{N}$ +is further denoted as $\llbracket 1, \mathsf{N} \rrbracket$. +A {\emph{Boolean map} $f$ is +a function from $\Bool^{\mathsf{N}}$ +to itself such that -$x=(x_1,\dots,x_n)$ maps to $f(x)=(f_1(x),\dots,f_n(x))$. +$x=(x_1,\dots,x_{\mathsf{N}})$ maps to $f(x)=(f_1(x),\dots,f_{\mathsf{N}}(x))$. +In what follows, for any finite set $X$, $|X|$ denotes its cardinality and +$\lfloor y \rfloor$ is +the largest integer lower than $y$. + Functions are iterated as follows. -At the $t^{th}$ iteration, only the $s_{t}-$th component is -``iterated'', where $s = \left(s_t\right)_{t \in \mathds{N}}$ is a sequence of indices taken in $\llbracket 1;n \rrbracket$ called ``strategy''. Formally, -let $F_f: \llbracket1;n\rrbracket\times \Bool^{n}$ to $\Bool^n$ be defined by +At the $t^{th}$ iteration, only the $s_{t}-$th component is said to be +``iterated'', where $s = \left(s_t\right)_{t \in \mathds{N}}$ is a sequence of indices taken in $\llbracket 1;{\mathsf{N}} \rrbracket$ called ``strategy''. +Formally, +let $F_f: \Bool^{{\mathsf{N}}} \times \llbracket1;{\mathsf{N}}\rrbracket$ to $\Bool^{\mathsf{N}}$ be defined by \[ -F_f(i,x)=(x_1,\dots,x_{i-1},f_i(x),x_{i+1},\dots,x_n). +F_f(x,i)=(x_1,\dots,x_{i-1},f_i(x),x_{i+1},\dots,x_{\mathsf{N}}). \] -Then, let $x^0\in\Bool^n$ be an initial configuration +Then, let $x^0\in\Bool^{\mathsf{N}}$ be an initial configuration and $s\in -\llbracket1;n\rrbracket^\Nats$ be a strategy, +\llbracket1;{\mathsf{N}}\rrbracket^\Nats$ be a strategy, the dynamics are described by the recurrence \begin{equation}\label{eq:asyn} -x^{t+1}=F_f(s_t,x^t). +x^{t+1}=F_f(x^t,s_t). \end{equation} + + + Let be given a Boolean map $f$. Its associated {\emph{iteration graph}} $\Gamma(f)$ is the directed graph such that the set of vertices is -$\Bool^n$, and for all $x\in\Bool^n$ and $i\in \llbracket1;n\rrbracket$, -the graph $\Gamma(f)$ contains an arc from $x$ to $F_f(i,x)$. +$\Bool^{\mathsf{N}}$, and for all $x\in\Bool^{\mathsf{N}}$ and $i\in \llbracket1;{\mathsf{N}}\rrbracket$, +the graph $\Gamma(f)$ contains an arc from $x$ to $F_f(x,i)$. +Each arc $(x,F_f(x,i))$ is labelled with $i$. + \begin{xpl} -Let us consider for instance $n=3$. +Let us consider for instance ${\mathsf{N}}=3$. Let $f^*: \Bool^3 \rightarrow \Bool^3$ be defined by - $f^*(x_1,x_2,x_3) = (x_2 \oplus x_3, \overline{x_1}\overline{x_3} + x_1\overline{x_2}, -\overline{x_1}\overline{x_3} + x_1x_2)$ +\overline{x_1}\overline{x_3} + x_1x_2)$. The iteration graph $\Gamma(f^*)$ of this function is given in Figure~\ref{fig:iteration:f*}. +\end{xpl} -\vspace{-1em} \begin{figure}[ht] \begin{center} -\includegraphics[scale=0.5]{images/iter_f0b} +\includegraphics[scale=0.5]{images/iter_f0c} \end{center} -\vspace{-0.5em} \caption{Iteration Graph $\Gamma(f^*)$ of the function $f^*$}\label{fig:iteration:f*} \end{figure} -\end{xpl} - -\vspace{-0.5em} -It is easy to associate a Markov Matrix $M$ to such a graph $G(f)$ -as follows: - -$M_{ij} = \frac{1}{n}$ if there is an edge from $i$ to $j$ in $\Gamma(f)$ and $i \neq j$; $M_{ii} = 1 - \sum\limits_{j=1, j\neq i}^n M_{ij}$; and $M_{ij} = 0$ otherwise. - -\begin{xpl} -The Markov matrix associated to the function $f^*$ is -\[ -M=\dfrac{1}{3} \left( -\begin{array}{llllllll} -1&1&1&0&0&0&0&0 \\ -1&1&0&0&0&1&0&0 \\ -0&0&1&1&0&0&1&0 \\ -0&1&1&1&0&0&0&0 \\ -1&0&0&0&1&0&1&0 \\ -0&0&0&0&1&1&0&1 \\ -0&0&0&0&1&0&1&1 \\ -0&0&0&1&0&1&0&1 -\end{array} -\right) -\] - - - - - -\end{xpl} - - -It is usual to check whether rows of such kind of matrices -converge to a specific -distribution. -Let us first recall the \emph{Total Variation} distance $\tv{\pi-\mu}$, -which is defined for two distributions $\pi$ and $\mu$ on the same set -$\Omega$ by: -$$\tv{\pi-\mu}=\max_{A\subset \Omega} |\pi(A)-\mu(A)|.$$ -% It is known that -% $$\tv{\pi-\mu}=\frac{1}{2}\sum_{x\in\Omega}|\pi(x)-\mu(x)|.$$ - -Let then $M(x,\cdot)$ be the -distribution induced by the $x$-th row of $M$. If the Markov chain -induced by -$M$ has a stationary distribution $\pi$, then we define -$$d(t)=\max_{x\in\Omega}\tv{M^t(x,\cdot)-\pi}.$$ -Intuitively $d(t)$ is the largest deviation between -the distribution $\pi$ and $M^t(x,\cdot)$, which -is the result of iterating $t$ times the function. -Finally, let $\varepsilon$ be a positive number, the \emph{mixing time} -with respect to $\varepsilon$ is given by -$$t_{\rm mix}(\varepsilon)=\min\{t \mid d(t)\leq \varepsilon\}.$$ -It defines the smallest iteration number -that is sufficient to obtain a deviation lesser than $\varepsilon$. -% Notice that the upper and lower bounds of mixing times cannot -% directly be computed with eigenvalues formulae as expressed -% in~\cite[Chap. 12]{LevinPeresWilmer2006}. The authors of this latter work -% only consider reversible Markov matrices whereas we do no restrict our -% matrices to such a form. - - - -Let us finally present the pseudorandom number generator $\chi_{\textit{14Secrypt}}$ -which is based on random walks in $\Gamma(f)$. -More precisely, let be given a Boolean map $f:\Bool^n \rightarrow \Bool^n$, -a PRNG \textit{Random}, -an integer $b$ that corresponds to an awaited mixing time, and +Let us finally recall the pseudorandom number generator $\chi_{\textit{14Secrypt}}$ +\cite{DBLP:conf/secrypt/CouchotHGWB14} +formalized in Algorithm~\ref{CI Algorithm}. +It is based on random walks in $\Gamma(f)$. +More precisely, let be given a Boolean map $f:\Bool^{\mathsf{N}} \rightarrow \Bool^{\mathsf{N}}$, +an input PRNG \textit{Random}, +an integer $b$ that corresponds to a number of iterations, and an initial configuration $x^0$. Starting from $x^0$, the algorithm repeats $b$ times a random choice of which edge to follow and traverses this edge. The final configuration is thus outputted. -This PRNG is formalized in Algorithm~\ref{CI Algorithm}. - -\vspace{-1em} \begin{algorithm}[ht] -%\begin{scriptsize} -\KwIn{a function $f$, an iteration number $b$, an initial configuration $x^0$ ($n$ bits)} -\KwOut{a configuration $x$ ($n$ bits)} +\begin{scriptsize} +%\JFC{Mettre ceci dans une boite flottante} +\KwIn{a function $f$, an iteration number $b$, an initial configuration $x^0$ (${\mathsf{N}}$ bits)} +\KwOut{a configuration $x$ (${\mathsf{N}}$ bits)} $x\leftarrow x^0$\; \For{$i=0,\dots,b-1$} { -$s\leftarrow{\textit{Random}(n)}$\; -$x\leftarrow{F_f(s,x)}$\; +$s\leftarrow{\textit{Random}({\mathsf{N}})}$\; +$x\leftarrow{F_f(x,s)}$\; } return $x$\; -%\end{scriptsize} +\end{scriptsize} \caption{Pseudo Code of the $\chi_{\textit{14Secrypt}}$ PRNG} \label{CI Algorithm} \end{algorithm} -\vspace{-0.5em} -This PRNG is a particularized version of Algorithm given in~\cite{BCGR11}. -Compared to this latter, the length of the random -walk of our algorithm is always constant (and is equal to $b$) whereas it -was given by a second PRNG in this latter. -However, all the theoretical results that are given in~\cite{BCGR11} remain -true since the proofs do not rely on this fact. - -Let $f: \Bool^{n} \rightarrow \Bool^{n}$. -It has been shown~\cite[Th. 4, p. 135]{BCGR11}} that -if its iteration graph is strongly connected, then -the output of $\chi_{\textit{14Secrypt}}$ follows -a law that tends to the uniform distribution -if and only if its Markov matrix is a doubly stochastic matrix. - -Let us now present a method to -generate functions -with Doubly Stochastic matrix and Strongly Connected iteration graph, - denoted as DSSC matrix. + + + +With all this material, we can study the chaos properties of these +function. +This is the aims of the next section. +