From: Raphael Couturier Date: Thu, 20 Oct 2011 12:53:37 +0000 (+0200) Subject: new X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/dmems12.git/commitdiff_plain/8d8c7405f943188a7b597675cc8a23e95430b6d7 new --- diff --git a/dmems12.tex b/dmems12.tex index 572feb2..701ce92 100644 --- a/dmems12.tex +++ b/dmems12.tex @@ -26,7 +26,6 @@ \newcommand{\tab}{\ \ \ } - \begin{document} @@ -188,7 +187,7 @@ the cantilevers. They are called base profile and tip profile in the following. Furthermore, a reference profile is taken on the base of the cantilever array. -The pixels intensity $I$ (in gray level) of each profile is modelized by : +The pixels intensity $I$ (in gray level) of each profile is modelized by: \begin{equation} \label{equ:profile} @@ -217,7 +216,7 @@ images coming from the camera. The accuracy of results must be close to the maximum precision ever obtained experimentally on the architecture, i.e. 0.3nm. Finally, the latency between an image entering in the unit and the deflections must be as small as possible -(NB : future works plan to add some control on the cantilevers).\\ +(NB: future works plan to add some control on the cantilevers).\\ If we put aside some hardware issues like the speed of the link between the camera and the computation unit, the time to deserialize @@ -240,7 +239,7 @@ E6650 at 2.33GHz, this program reaches an average of 155Mflops. Obviously, some cache effects and optimizations on huge amount of computations can drastically increase these -performances : peak efficiency is about 2.5Gflops for the considered +performances: peak efficiency is about 2.5Gflops for the considered CPU. But this is not the case for phase computation that used only few tenth of values.\\ @@ -256,7 +255,7 @@ case of an occasional load of the system, it could be largely overtaken. A solution would be to use a real-time operating system but another one to search for a more efficient algorithm. -But the main drawback is the latency of such a solution : since each +But the main drawback is the latency of such a solution: since each profile must be treated one after another, the deflection of 100 cantilevers takes about $200\times 10.5 = 2.1$ms, which is inadequate for an efficient control. An obvious solution is to parallelize the @@ -337,7 +336,7 @@ pipelines in order to handle multiple data streams. The board we use is designed by the Armadeus compagny, under the name SP Vision. It consists in a development board hosting a i.MX27 ARM processor (from Freescale). The board includes all classical -connectors : USB, Ethernet, ... A Flash memory contains a Linux kernel +connectors: USB, Ethernet, ... A Flash memory contains a Linux kernel that can be launched after booting the board via u-Boot. The processor is directly connected to a Spartan3A FPGA (from Xilinx) @@ -371,23 +370,23 @@ Let consider a profile $P$, that is a segment of $M$ pixels with an intensity in gray levels. Let call $I(x)$ the intensity of profile in $x \in [0,M[$. -At first, only $M$ values of $I$ are known, for $x = 0, 1, -\ldots,M-1$. A normalisation allows to scale known intensities into -$[-1,1]$. We compute splines that fit at best these normalised -intensities. Splines are used to interpolate $N = k\times M$ points -(typically $k=4$ is sufficient), within $[0,M[$. Let call $x^s$ the -coordinates of these $N$ points and $I^s$ their intensities. +At first, only $M$ values of $I$ are known, for $x = 0, 1, \ldots,M-1$. A +normalisation allows to scale known intensities into $[-1,1]$. We compute +splines that fit at best these normalised intensities. Splines (SPL in the +following) are used to interpolate $N = k\times M$ points (typically $k=4$ is +sufficient), within $[0,M[$. Let call $x^s$ the coordinates of these $N$ points + and $I^s$ their intensities. In order to have the frequency, the mean line $a.x+b$ (see equation \ref{equ:profile}) of $I^s$ is computed. Finding intersections of $I^s$ and this line allow to obtain the period thus the frequency. -The phase is computed via the equation : +The phase is computed via the equation: \begin{equation} \theta = atan \left[ \frac{\sum_{i=0}^{N-1} sin(2\pi f x^s_i) \times I^s(x^s_i)}{\sum_{i=0}^{N-1} cos(2\pi f x^s_i) \times I^s(x^s_i)} \right] \end{equation} -Two things can be noticed : +Two things can be noticed: \begin{itemize} \item the frequency could also be obtained using the derivates of spline equations, which only implies to solve quadratic equations. @@ -400,9 +399,9 @@ Two things can be noticed : \subsubsection{Least square algorithm} Assuming that we compute the phase during the acquisition loop, -equation \ref{equ:profile} has only 4 parameters :$a, b, A$, and +equation \ref{equ:profile} has only 4 parameters: $a, b, A$, and $\theta$, $f$ and $x$ being already known. Since $I$ is non-linear, a -least square method based an Gauss-newton algorithm must be used to +least square method based on a Gauss-newton algorithm can be used to determine these four parameters. Since it is an iterative process ending with a convergence criterion, it is obvious that it is not particularly adapted to our design goals. @@ -410,16 +409,16 @@ particularly adapted to our design goals. Fortunatly, it is quite simple to reduce the number of parameters to only $\theta$. Let $x^p$ be the coordinates of pixels in a segment of size $M$. Thus, $x^p = 0, 1, \ldots, M-1$. Let $I(x^p)$ be their -intensity. Firstly, we "remove" the slope by computing : +intensity. Firstly, we "remove" the slope by computing: \[I^{corr}(x^p) = I(x^p) - a.x^p - b\] Since linear equation coefficients are searched, a classical least -square method can be used to determine $a$ and $b$ : +square method can be used to determine $a$ and $b$: \[a = \frac{covar(x^p,I(x^p))}{var(x^p)} \] -Assuming an overlined symbol means an average, then : +Assuming an overlined symbol means an average, then: \[b = \overline{I(x^p)} - a.\overline{{x^p}}\] @@ -427,22 +426,22 @@ Let $A$ be the amplitude of $I^{corr}$, i.e. \[A = \frac{max(I^{corr}) - min(I^{corr})}{2}\] -Then, the least square method to find $\theta$ is reduced to search the minimum of : +Then, the least square method to find $\theta$ is reduced to search the minimum of: \[\sum_{i=0}^{M-1} \left[ cos(2\pi f.i + \theta) - \frac{I^{corr}(i)}{A} \right]^2\] -It is equivalent to derivate this expression and to solve the following equation : +It is equivalent to derivate this expression and to solve the following equation: \begin{eqnarray*} 2\left[ cos\theta \sum_{i=0}^{M-1} I^{corr}(i).sin(2\pi f.i) + sin\theta \sum_{i=0}^{M-1} I^{corr}(i).cos(2\pi f.i)\right] \\ - A\left[ cos2\theta \sum_{i=0}^{M-1} sin(4\pi f.i) + sin2\theta \sum_{i=0}^{M-1} cos(4\pi f.i)\right] = 0 \end{eqnarray*} -Several points can be noticed : +Several points can be noticed: \begin{itemize} \item As in the spline method, some parts of this equation can be computed before the acquisition loop. It is the case of sums that do - not depend on $\theta$ : + not depend on $\theta$: \[ \sum_{i=0}^{M-1} sin(4\pi f.i), \sum_{i=0}^{M-1} cos(4\pi f.i) \] @@ -452,7 +451,7 @@ computed. \item The simplest method to find the good $\theta$ is to discretize $[-\pi,\pi]$ in $nb_s$ steps, and to search which step leads to the result closest to zero. By the way, three other lookup tables can - also be computed before the loop : + also be computed before the loop: \[ sin \theta, cos \theta, \] @@ -462,7 +461,7 @@ computed. \end{itemize} -Finally, the whole summarizes in an algorithm (called LSQ in the following) in two parts, one before and one during the acquisition loop : +Finally, the whole summarizes in an algorithm (called LSQ in the following) in two parts, one before and one during the acquisition loop: \begin{algorithm}[h] \caption{LSQ algorithm - before acquisition loop.} \label{alg:lsq-before} @@ -549,7 +548,7 @@ Finally, the whole summarizes in an algorithm (called LSQ in the following) in t \subsubsection{Comparison} -We compared the two algorithms on the base of three criterions : +We compared the two algorithms on the base of three criteria: \begin{itemize} \item precision of results on a cosinus profile, distorted with noise, \item number of operations, @@ -568,12 +567,12 @@ discretization correspond to an error of 0.15nm on the lever deflection, which is smaller than the best precision they achieved, i.e. 0.3nm. -For each test, we add some noise to the profile : each group of two +For each test, we add some noise to the profile: each group of two pixels has its intensity added to a random number picked in $[-N,N]$ (NB: it should be noticed that picking a new value for each pixel does not distort enough the profile). The absolute error on the result is evaluated by comparing the difference between the reference and -computed phase, out of $2\pi$, expressed in percents. That is : $err = +computed phase, out of $2\pi$, expressed in percents. That is: $err = 100\times \frac{|\theta_{ref} - \theta_{comp}|}{2\pi}$. Table \ref{tab:algo_prec} gives the maximum and average error for the two algorithms and increasing values of $N$. @@ -615,7 +614,7 @@ largely beyond the worst experimental ones. \begin{figure}[ht] \begin{center} - \includegraphics[width=9cm]{intens-noise20} + \includegraphics[width=\columnwidth]{intens-noise20} \end{center} \caption{Sample of worst profile for N=10} \label{fig:noise20} @@ -623,7 +622,7 @@ largely beyond the worst experimental ones. \begin{figure}[ht] \begin{center} - \includegraphics[width=9cm]{intens-noise60} + \includegraphics[width=\columnwidth]{intens-noise60} \end{center} \caption{Sample of worst profile for N=30} \label{fig:noise60} @@ -640,11 +639,11 @@ $<$, $>$) is taken account. Translating the two algorithms in C code, we obtain about 430 operations for LSQ and 1550 (plus few tenth for $atan$) for SPL. This result is largely in favor of LSQ. Nevertheless, considering the total number of operations is not really pertinent for -an FPGA implementation : it mainly depends on the type of operations +an FPGA implementation: it mainly depends on the type of operations and their ordering. The final decision is thus driven by the third criterion.\\ -The Spartan 6 used in our architecture has hard constraint : it has no +The Spartan 6 used in our architecture has hard constraint: it has no built-in floating point units. Obviously, it is possible to use some existing "black-boxes" for double precision operations. But they have a quite long latency. It is much simpler to exclusively use integers, @@ -654,14 +653,14 @@ results. Furthermore, it should not lead to a design with a huge latency because of operations that could not complete during a single or few clock cycles. Divisions are in this case and, moreover, they need an varying number of clock cycles to complete. Even -multiplications can be a problem : DSP48 take inputs of 18 bits +multiplications can be a problem: DSP48 take inputs of 18 bits maximum. For larger multiplications, several DSP must be combined, increasing the latency. Nevertheless, the hardest constraint does not come from the FPGA characteristics but from the algorithms. Their VHDL implentation will be efficient only if they can be fully (or near) pipelined. By the -way, the choice is quickly done : only a small part of SPL can be. +way, the choice is quickly done: only a small part of SPL can be. Indeed, the computation of spline coefficients implies to solve a tridiagonal system $A.m = b$. Values in $A$ and $b$ can be computed from incoming pixels intensity but after, the back-solve starts with @@ -670,7 +669,7 @@ interpolating far more points than profile size. Thus, the end of SPL works on a larger amount of data than the beginning, which also breaks the pipeline. -LSQ has not this problem : all parts except the dichotomial search +LSQ has not this problem: all parts except the dichotomial search work on the same amount of data, i.e. the profile size. Furthermore, LSQ needs less operations than SPL, implying a smaller output latency. Consequently, it is the best candidate for phase @@ -681,7 +680,7 @@ mapping and routing the design on the Spartan6. By the way, extra-latency is generated and there must be idle times between two profiles entering into the pipeline. -%%Before obtaining the least bitstream, the crucial question is : how to +%%Before obtaining the least bitstream, the crucial question is: how to %%translate the C code the LSQ into VHDL ?