X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/dmems12.git/blobdiff_plain/77fc759e3cccd43e2d9f6ee355069a0e80e5221f..345031161b496f25408c29c01bbca3a77157de9f:/dmems12.tex?ds=sidebyside diff --git a/dmems12.tex b/dmems12.tex index d8d592d..93d7fbc 100644 --- a/dmems12.tex +++ b/dmems12.tex @@ -1,5 +1,5 @@ -\documentclass[10pt, conference, compsocconf]{IEEEtran} +\documentclass[10pt, peerreview, compsocconf]{IEEEtran} %\usepackage{latex8} %\usepackage{times} \usepackage[utf8]{inputenc} @@ -58,7 +58,7 @@ -\maketitle +%\maketitle \thispagestyle{empty} @@ -66,9 +66,16 @@ -{\it keywords}: FPGA, cantilever, interferometry. + \end{abstract} +\begin{IEEEkeywords} +FPGA, cantilever, interferometry. +\end{IEEEkeywords} + + +\IEEEpeerreviewmaketitle + \section{Introduction} Cantilevers are used inside atomic force microscope (AFM) which provides high @@ -196,42 +203,92 @@ on spline interpolation (see section \ref{algo-spline}). It also computes the coefficient used for unwrapping the phase. The second one is the acquisition loop, while which images are taken at regular time steps. For each image, the phase $\theta$ of all profiles is computed -to obtain, after unwrapping, the deflection of cantilevers. +to obtain, after unwrapping, the deflection of +cantilevers. Originally, this computation was also done with an +algorithm based on spline. This article proposes a new version based +on a least square method. \subsection{Design goals} \label{sec:goals} +The main goal is to implement a computing unit to estimate the +deflection of about $10\times10$ cantilevers, faster than the stream of +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).\\ + If we put aside some hardware issues like the speed of the link between the camera and the computation unit, the time to deserialize pixels and to store them in memory, ... the phase computation is obviously the bottle-neck of the whole process. For example, if we consider the camera actually in use, an exposition time of 2.5ms for -$1024\times 1204$ pixels seems the minimum that can be reached. For a -$10\times 10$ cantilever array, if we neglect the time to extract -pixels, it implies that computing the deflection of a single +$1024\times 1204$ pixels seems the minimum that can be reached. For +100 cantilevers, if we neglect the time to extract pixels, it implies +that computing the deflection of a single cantilever should take less than 25$\mu$s, thus 12.5$\mu$s by phase.\\ In fact, this timing is a very hard constraint. Let consider a very small programm that initializes twenty million of doubles in memory and then does 1000000 cumulated sums on 20 contiguous values (experimental profiles have about this size). On an intel Core 2 Duo -E6650 at 2.33GHz, this program reaches an average of 155Mflops. It -implies that the phase computation algorithm should not take more than -$240\times 12.5 = 1937$ floating operations. For integers, it gives -$3000$ operations. - -%% to be continued ... - -%% � faire : timing de l'algo spline en C avec atan et tout le bordel. - - +E6650 at 2.33GHz, this program reaches an average of 155Mflops. + +%%Itimplies that the phase computation algorithm should not take more than +%%$155\times 12.5 = 1937$ floating operations. For integers, it gives $3000$ operations. + +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 +CPU. But this is not the case for phase computation that used only few +tenth of values.\\ + +In order to evaluate the original algorithm, we translated it in C +language. Profiles are read from a 1Mo file, as if it was an image +stored in a device file representing the camera. The file contains 100 +profiles of 21 pixels, equally scattered in the file. We obtained an +average of 10.5$\mu$s by profile (including I/O accesses). It is under +are requirements but close to the limit. In 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 +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 +computations, for example on a GPU. Nevertheless, the cost to transfer +profile in GPU memory and to take back results would be prohibitive +compared to computation time. It is certainly more efficient to +pipeline the computation. For example, supposing that 200 profiles of +20 pixels can be pushed sequentially in the pipelined unit cadenced at +a 100MHz (i.e. a pixel enters in the unit each 10ns), all profiles +would be treated in $200\times 20\times 10.10^{-9} =$ 40$\mu$s plus +the latency of the pipeline. This is about 500 times faster than +actual results.\\ + +For these reasons, an FPGA as the computation unit is the best choice +to achieve the required performance. Nevertheless, passing from +a C code to a pipelined version in VHDL is not obvious at all. As +explained in the next section, it can even be impossible because of +some hardware constraints specific to FPGAs. \section{Proposed solution} \label{sec:solus} +Project Oscar aims to provide an hardware and software architecture to +estimate and control the deflection of cantilevers. The hardware part +consists in a high-speed camera, linked on an embedded board hosting +FPGAs. By the way, the camera output stream can be pushed directly +into the FPGA. The software part is mostly the VHDL code that +deserializes the camera stream, extracts profile and computes the +deflection. Before focusing on our work to implement the phase +computation, we give some general informations about FPGAs and the +board we use. -\subsection{FPGA constraints} +\subsection{FPGAs} A field-programmable gate array (FPGA) is an integrated circuit designed to be configured by the customer. A hardware description language (HDL) is used to @@ -246,8 +303,8 @@ should be programmed using simple components. FGPAs programming is very different from classic processors programming. When logic block are programmed and linked to performed an operation, they cannot be -reused anymore. FPGA are cadenced slowly than classic processors but they can -performed pipelined as well as pipelined operations. A pipeline provides a way +reused anymore. FPGA are cadenced more slowly than classic processors but they can +performed pipelined as well as parallel operations. A pipeline provides a way manipulate data quickly since at each clock top to handle a new data. However, using a pipeline consomes more logics and components since they are not reusable, nevertheless it is probably the most efficient technique on FPGA. @@ -256,8 +313,30 @@ simultaneously. When it is possible, using a pipeline is a good solution to manipulate new data at each clock top and using parallelism to handle simultaneously several data streams. -%% contraintes imposées par le FPGA : algo pipeline/parallele, pas d'op math complexe, ... +%% parler du VHDL, synthèse et bitstream +\subsection{The board} + +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 +that can be launched after booting the board via u-Boot. +The processor is directly connected to a Spartan3A FPGA (from Xilinx) +via its special interface called WEIM. The Spartan3A is itself +connected to a Spartan6 FPGA. Thus, it is possible to develop programs +that communicate between i.MX and Spartan6, using Spartan3 as a +tunnel. By default, the WEIM interface provides a clock signal at +100MHz that is connected to dedicated FPGA pins. + +The Spartan6 is an LX100 version. It has 15822 slices, equivalent to +101261 logic cells. There are 268 internal block RAM of 18Kbits, and +180 dedicated multiply-adders (named DSP48), which is largely enough +for our project. + +Some I/O pins of Spartan6 are connected to two $2\times 17$ headers +that can be used as user wants. For the project, they will be +connected to the interface card of the camera. \subsection{Considered algorithms} @@ -278,7 +357,7 @@ 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 $k=3$ is sufficient), within $[0,M[$. Let call $x^s$ the +(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 @@ -290,12 +369,15 @@ The phase is computed via the 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. Firstly, the frequency could also be -obtained using the derivates of spline equations, which only implies -to solve quadratic equations. Secondly, frequency of each profile is -computed a single time, before the acquisition loop. Thus, $sin(2\pi f -x^s_i)$ and $cos(2\pi f x^s_i)$ could also be computed before the loop, which leads to a -much faster computation of $\theta$. +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. +\item frequency of each profile is computed a single time, before the + acquisition loop. Thus, $sin(2\pi f x^s_i)$ and $cos(2\pi f x^s_i)$ + could also be computed before the loop, which leads to a much faster + computation of $\theta$. +\end{itemize} \subsubsection{Least square algorithm} @@ -350,13 +432,15 @@ Several points can be noticed : computed. \item The simplest method to find the good $\theta$ is to discretize - $[-\pi,\pi]$ in $N$ steps, and to search which step leads to the + $[-\pi,\pi]$ 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 : -\[ sin \theta, cos \theta, \left[ cos 2\theta \sum_{i=0}^{M-1} sin(4\pi f.i) + sin 2\theta \sum_{i=0}^{M-1} cos(4\pi f.i)\right] \] +\[ sin \theta, cos \theta, \] + +\[ \left[ cos 2\theta \sum_{i=0}^{M-1} sin(4\pi f.i) + sin 2\theta \sum_{i=0}^{M-1} cos(4\pi f.i)\right] \] -\item This search can be very fast using a dichotomous process in $log_2(N)$ +\item This search can be very fast using a dichotomous process in $log_2(nb_s)$ \end{itemize} @@ -374,15 +458,15 @@ Finally, the whole summarizes in an algorithm (called LSQ in the following) in t \For{$i=0$ to $nb_s $}{ $\theta \leftarrow -\pi + 2\pi\times \frac{i}{nb_s}$\\ - lut\_sin[$i$] $\leftarrow sin \theta$\\ - lut\_cos[$i$] $\leftarrow cos \theta$\\ - lut\_A[$i$] $\leftarrow cos 2 \theta \times s4i + sin 2 \theta \times c4i$\\ - lut\_sinfi[$i$] $\leftarrow sin (2\pi f.i)$\\ - lut\_cosfi[$i$] $\leftarrow cos (2\pi f.i)$\\ + lut$_s$[$i$] $\leftarrow sin \theta$\\ + lut$_c$[$i$] $\leftarrow cos \theta$\\ + lut$_A$[$i$] $\leftarrow cos 2 \theta \times s4i + sin 2 \theta \times c4i$\\ + lut$_{sfi}$[$i$] $\leftarrow sin (2\pi f.i)$\\ + lut$_{cfi}$[$i$] $\leftarrow cos (2\pi f.i)$\\ } \end{algorithm} -\begin{algorithm}[h] +\begin{algorithm}[ht] \caption{LSQ algorithm - during acquisition loop.} \label{alg:lsq-during} @@ -399,7 +483,7 @@ Finally, the whole summarizes in an algorithm (called LSQ in the following) in t $slope \leftarrow \frac{xy_{covar}}{x_{var}}$\\ $start \leftarrow y_{moy} - slope\times \bar{x}$\\ \For{$i=0$ to $M-1$}{ - $I[i] \leftarrow I[i] - start - slope\times i$\tcc*[f]{slope removal}\\ + $I[i] \leftarrow I[i] - start - slope\times i$\\ } $I_{max} \leftarrow max_i(I[i])$, $I_{min} \leftarrow min_i(I[i])$\\ @@ -407,32 +491,202 @@ Finally, the whole summarizes in an algorithm (called LSQ in the following) in t $Is \leftarrow 0$, $Ic \leftarrow 0$\\ \For{$i=0$ to $M-1$}{ - $Is \leftarrow Is + I[i]\times $ lut\_sinfi[$i$]\\ - $Ic \leftarrow Ic + I[i]\times $ lut\_cosfi[$i$]\\ + $Is \leftarrow Is + I[i]\times $ lut$_{sfi}$[$i$]\\ + $Ic \leftarrow Ic + I[i]\times $ lut$_{cfi}$[$i$]\\ } - $\theta \leftarrow -\pi$\\ - $val_1 \leftarrow 2\times \left[ Is.\cos(\theta) + Ic.\sin(\theta) \right] - amp\times \left[ c4i.\sin(2\theta) + s4i.\cos(2\theta) \right]$\\ - \For{$i=1-n_s$ to $n_s$}{ - $\theta \leftarrow \frac{i.\pi}{n_s}$\\ - $val_2 \leftarrow 2\times \left[ Is.\cos(\theta) + Ic.\sin(\theta) \right] - amp\times \left[ c4i.\sin(2\theta) + s4i.\cos(2\theta) \right]$\\ + $\delta \leftarrow \frac{nb_s}{2}$, $b_l \leftarrow 0$, $b_r \leftarrow \delta$\\ + $v_l \leftarrow -2.I_s - amp.$lut$_A$[$b_l$]\\ + + \While{$\delta >= 1$}{ + + $v_r \leftarrow 2.[ Is.$lut$_c$[$b_r$]$ + Ic.$lut$_s$[$b_r$]$ ] - amp.$lut$_A$[$b_r$]\\ - \lIf{$val_1 < 0$ et $val_2 >= 0$}{ - $\theta_s \leftarrow \theta - \left[ \frac{val_2}{val_2-val_1}\times \frac{\pi}{n_s} \right]$\\ + \If{$!(v_l < 0$ and $v_r >= 0)$}{ + $v_l \leftarrow v_r$ \\ + $b_l \leftarrow b_r$ \\ } - $val_1 \leftarrow val_2$\\ + $\delta \leftarrow \frac{\delta}{2}$\\ + $b_r \leftarrow b_l + \delta$\\ + } + \uIf{$!(v_l < 0$ and $v_r >= 0)$}{ + $v_l \leftarrow v_r$ \\ + $b_l \leftarrow b_r$ \\ + $b_r \leftarrow b_l + 1$\\ + $v_r \leftarrow 2.[ Is.$lut$_c$[$b_r$]$ + Ic.$lut$_s$[$b_r$]$ ] - amp.$lut$_A$[$b_r$]\\ + } + \Else { + $b_r \leftarrow b_l + 1$\\ } -\end{algorithm} + \uIf{$ abs(v_l) < v_r$}{ + $b_{\theta} \leftarrow b_l$ \\ + } + \Else { + $b_{\theta} \leftarrow b_r$ \\ + } + $\theta \leftarrow \pi\times \left[\frac{2.b_{ref}}{nb_s}-1\right]$\\ +\end{algorithm} \subsubsection{Comparison} -\subsection{VHDL design paradigms} +We compared the two algorithms on the base of three criterions : +\begin{itemize} +\item precision of results on a cosinus profile, distorted with noise, +\item number of operations, +\item complexity to implement an FPGA version. +\end{itemize} + +For the first item, we produced a matlab version of each algorithm, +running with double precision values. The profile was generated for +about 34000 different values of period ($\in [3.1, 6.1]$, step = 0.1), +phase ($\in [-3.1 , 3.1]$, step = 0.062) and slope ($\in [-2 , 2]$, +step = 0.4). For LSQ, $nb_s = 1024$, which leads to a maximal error of +$\frac{\pi}{1024}$ on phase computation. Current A. Meister and +M. Favre experiments show a ratio of 50 between variation of phase and +the deflection of a lever. Thus, the maximal error due to +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 +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 : $err = +100\times \frac{|\theta_{ref} - \theta_{comp}|}{2\pi}$. + +Table \ref{tab:algo_prec} gives the maximum and average error for the two algorithms and increasing values of $N$. + +\begin{table}[ht] + \begin{center} + \begin{tabular}{|c|c|c|c|c|} + \hline + & \multicolumn{2}{c|}{SPL} & \multicolumn{2}{c|}{LSQ} \\ \cline{2-5} + noise & max. err. & aver. err. & max. err. & aver. err. \\ \hline + 0 & 2.46 & 0.58 & 0.49 & 0.1 \\ \hline + 2.5 & 2.75 & 0.62 & 1.16 & 0.22 \\ \hline + 5 & 3.77 & 0.72 & 2.47 & 0.41 \\ \hline + 7.5 & 4.72 & 0.86 & 3.33 & 0.62 \\ \hline + 10 & 5.62 & 1.03 & 4.29 & 0.81 \\ \hline + 15 & 7.96 & 1.38 & 6.35 & 1.21 \\ \hline + 30 & 17.06 & 2.6 & 13.94 & 2.45 \\ \hline + +\end{tabular} +\caption{Error (in \%) for cosinus profiles, with noise.} +\label{tab:algo_prec} +\end{center} +\end{table} + +These results show that the two algorithms are very close, with a +slight advantage for LSQ. Furthemore, both behave very well against +noise. Assuming the experimental ratio of 50 (see above), an error of +1 percent on phase correspond to an error of 0.5nm on the lever +deflection, which is very close to the best precision. + +Obviously, it is very hard to predict which level of noise will be +present in real experiments and how it will distort the +profiles. Nevertheless, we can see on figure \ref{fig:noise20} the +profile with $N=10$ that leads to the biggest error. It is a bit +distorted, with pikes and straight/rounded portions, and relatively +close to most of that come from experiments. Figure \ref{fig:noise60} +shows a sample of worst profile for $N=30$. It is completly distorted, +largely beyond the worst experimental ones. + +\begin{figure}[ht] +\begin{center} + \includegraphics[width=9cm]{intens-noise20-spl} +\end{center} +\caption{Sample of worst profile for N=10} +\label{fig:noise20} +\end{figure} + +\begin{figure}[ht] +\begin{center} + \includegraphics[width=9cm]{intens-noise60-lsq} +\end{center} +\caption{Sample of worst profile for N=30} +\label{fig:noise60} +\end{figure} + +The second criterion is relatively easy to estimate for LSQ and harder +for SPL because of $atan$ operation. In both cases, it is proportional +to numbers of pixels $M$. For LSQ, it also depends on $nb_s$ and for +SPL on $N = k\times M$, i.e. the number of interpolated points. + +We assume that $M=20$, $nb_s=1024$, $k=4$, all possible parts are +already in lookup tables and a limited set of operations (+, -, *, /, +<, >) 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 +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 +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, +with a quantization of all double precision values. Obviously, this +quantization should not decrease too much the precision of +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 +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. +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 +the lastest values, which breaks the pipeline. Moreover, SPL relies on +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 +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 +computation. Nevertheless, obtaining a fully pipelined version +supposes that operations of different parts complete in a single clock +cycle. It is the case for simulations but it completely fails when +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 +%%translate the C code the LSQ into VHDL ? + + +%\subsection{VHDL design paradigms} + +\section{Experimental tests} \subsection{VHDL implementation} -\section{Experimental results} +% - ecriture d'un code en C avec integer +% - calcul de la taille max en bit de chaque variable en fonction de la quantization. +% - tests de quantization : équilibre entre précision et contraintes FPGA +% - en parallèle : simulink et VHDL à la main +% +\subsection{Simulation} + +% ghdl + gtkwave +% au mieux : une phase tous les 33 cycles, latence de 95 cycles. +% mais routage/placement impossible. +\subsection{Bitstream creation} + +% pas fait mais prévision d'une sortie tous les 480ns avec une latence de 1120 + \label{sec:results}