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\chapter{Operation} \section{Pipeline operation} The operation of the pipeline is shown in Figure~\ref{fig:pipeline_op}. One can see that the stages are started every 2 clock cycles ($\tau_{c}$ is the core clock period). This is needed because the least significant bit of the next stage result is needed. Every stage has to run $n$ (the width of the operands) times for the multiplication to be complete. \begin{figure}[H] \centering \includegraphics[trim=1.2cm 1.2cm 1.2cm 1.2cm, width=7cm]{pictures/pipeline_operation.pdf} \caption{Pipeline operation: Each circle represents an active stage. The number indicates how much times that stage has run. Dotted line contours indicate the stage is inactive.} \label{fig:pipeline_op} \end{figure} For performing one Montgomery multiplication using this core, the total computation time $T_m$ for an $n$-bit operand with a $k$-stage pipeline is given by~(\ref{eq:Tmult}). \begin{align}\label{eq:Tmult} T_{m} = \left[k + 2(n - 1)\right] \tau_c \end{align} \newpage \section{Modular Simultaneous exponentiation operations} Exponentiations are calculated with Algorithm~\ref{alg:mme} which uses the Montgomery multiplier as the main computation step. It uses the principle of a square-and-multiply algorithm to calculate an exponentiation with 2 bases. \begin{algorithm}[H] % enter the algorithm environment \caption{Montgomery simultaneous exponentiation} % give the algorithm a caption \label{alg:mme} % and a label for \ref{} commands later in the document \algnewcommand\algorithmicdownto{\textbf{downto}} \algrenewtext{For}[3]% {\algorithmicfor\ #1 $\gets$ #2 \algorithmicdownto\ #3 \algorithmicdo} \algnewcommand\algorithmicswitch{\textbf{switch}} \algrenewtext{While}[2]% {\algorithmicswitch\ #1, #2} \algnewcommand\algorithmicinput{\textbf{Input:}} \algnewcommand\Input{\item[\algorithmicinput]} \algnewcommand\algorithmicoutput{\textbf{Output:}} \algnewcommand\Output{\item[\algorithmicoutput]} \footnotesize \begin{algorithmic}[1] % enter the algorithmic environment \Input $g_{0},\:g_{1},\:e_{0}=(e_{0_{t-1}} \cdots e_{0_{0}})_{2},\:e_{1}=(e_{0_{t-1}} \cdots e_{0_{0}})_{2},\:R^{2}\bmod m,\:m$ \Output $g_{0}^{e_{0}} \cdot g_{1}^{e_{1}} \bmod m$ \State $\tilde{g}_{0} := \text{Mont}(g_{0}, R^{2}),\:\tilde{g}_{1} := \text{Mont}(g_{1}, R^{2}),\:\tilde{g}_{01} := \text{Mont}(\tilde{g}_{0}, \tilde{g}_{1})$ \State $a := \text{Mont}(R^{2}, 1)$ \Comment This is the same as $a := R \bmod m$. \For{$i$}{$(t-1)$}{0} \State $a := \text{Mont}(a, a)$ \While{$e_{1_{i}}$}{$e_{0_{i}}$} % use as switch statement \State $0,\:1:\;a := \text{Mont}(a, \tilde{g}_{0})$ \State $1,\:0:\;a := \text{Mont}(a, \tilde{g}_{1})$ \State $1,\:1:\;a := \text{Mont}(a, \tilde{g}_{01})$ \EndWhile \EndFor \State $a := \text{Mont}(a, 1)$ \State \Return{$a$} \end{algorithmic} \end{algorithm} It can be seen that the algorithm requires $R^{2}\bmod m$ which is $2^{2n}\bmod m$. We assume $R^2 \bmod m$ can be provided or pre-computed. The for loop in the algorithm is executed by the control logic of the core. Apart from this, a few pre- and one post-calculations have to be performed. The computation time for an exponentiation depends on the number of zero's in the exponents, from Algorithm~\ref{alg:mme} one can see that if both exponent bits are zero at a time, no multiplication has to be performed. Thus reducing the total time. The average computation time for a modular simultaneous exponentiation, with $n$-bit base operands and $t$-bit exponents is given by~(\ref{eq:Tsime}). \begin{align}\label{eq:Tsime} T_{se} = \frac{7}{4} t \cdot T_{m} = \frac{7}{4}t \cdot [k + 2(n - 1)] \tau_c \end{align} For single base exponentiations, i.e. 1 exponent is equal to zero, the average exponentiation time is given by~(\ref{eq:Texp}). \begin{align}\label{eq:Texp} T_{e} = \frac{3}{2} t \cdot T_{m} = \frac{3}{2}t \cdot [k + 2(n - 1)] \tau_c \end{align} The formulas~(\ref{eq:Tsime}) and~(\ref{eq:Texp}) given here are only the theoretical average time for an exponentiation, excluding the pre- and post-computations. \section{Core operation steps} The core can operate in 2 modes, multiplication or exponentiation mode. The steps required to do one of these actions are described here. \subsection{Single Montgomery multiplication} The following steps are needed for a single Montgomery multiplication: \begin{enumerate} \item load the modulus to the RAM using the 32 bit bus \item load the desired $x$ and $y$ operands into any 2 locations of the operand RAM using the 32 bit bus. \item select the correct input operands for the multiplier using \verb|x_sel_single| and \verb|y_sel_single| \item select the result destination operand using \verb|result_dest_op| \item set \verb|exp/m| = `0' to select multiplication mode \item set \verb|p_sel| to choose which pipeline part you will use \item generate a start pulse for the core \item wait until interrupt is received and read out result in selected operand \end{enumerate} \textbf{Note:} this computation gives a result \( r = x \cdot y \cdot R^{-1} \bmod m\). If the actual product of $x$ and $y$ is desired, a final Montgomery multiplication of the result with $R^{2}$ is needed. \subsection{Modular simultaneous exponentiation} The core requires $\tilde{g}_{0}$, $\tilde{g}_{0}$, $\tilde{g}_{01}$ and $a$ to be loaded into the correct operand spaces before starting the exponentiation. These parameters are calculated using single Montgomery multiplications as follows: \begin{align*} \tilde{g}_{0} &= Mont(g_{0}, R^{2}) &\,&= g_{0} \cdot R \bmod m & \hspace{3cm}\text{in operand 0}\hspace{4cm}\\ \tilde{g}_{1} &= Mont(g_{1}, R^{2}) &\,&= g_{1} \cdot R \bmod m & \hspace{3cm}\text{in operand 1}\hspace{4cm}\\ \tilde{g}_{01} &= Mont(\tilde{g}_{0}, \tilde{g}_{1}) &\,&= g_{0} \cdot g_{1} \cdot R \bmod m & \hspace{3cm}\text{in operand 2}\hspace{4cm}\\ a &= Mont(R^{2}, 1) &\,&= R \bmod m &\hspace{3cm}\text{in operand 3}\hspace{4cm} \end{align*} When the exponentiation is done, a final multiplication has to be started by the software to multiply $a$ with 1. The steps needed for a full simultaneous exponentiation are: \begin{enumerate} \item load the modulus to the RAM using the 32 bit bus \item load the desired $g_0$, $g_1$ operands and \(R^{2} \bmod m\) into the operand RAM using the 32 bit bus. \item set \verb|p_sel| to choose which pipeline part you will use \item compute $\tilde{g}_{0}$ by using a single Montgomery multiplication of $g_{0}$ with $R^{2}$ and place the result $\tilde{g}_{0}$ in operand 0. \item compute $\tilde{g}_{1}$ by using a single Montgomery multiplication of $g_{1}$ with $R^{2}$ and place the result $\tilde{g}_{1}$ in operand 1. \item compute $\tilde{g}_{01}$ by using a single Montgomery multiplication of $\tilde{g}_{0}$ with $\tilde{g}_{1}$ and place the result $\tilde{g}_{01}$ in operand 2. \item compute $a$ by using a single Montgomery multiplication of $R^{2}$ with $1$ and place the result $a$ in operand 3. \item set the core in exponentiation mode ($exp/m$='1') \item generate a start pulse for the core \item wait until interrupt is received \item perform the post-computation using a single Montgomery multiplication of $a$(in operand 3) with 1 and read out result \end{enumerate}
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