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6 \journal{Journal of Computational Science}
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110 \title{Optimizing Energy Consumption with DVFS for Message \\
111 Passing Applications \textcolor{blue}{with iterations} on \\
117 \author{Ahmed Fanfakh,
122 \address{FEMTO-ST Institute, University of Franche-Comté\\
123 IUT de Belfort-Montbéliard,
124 19 avenue du Maréchal Juin, BP 527, 90016 Belfort cedex, France\\
125 % Telephone: \mbox{+33 3 84 58 77 86}, % Raphaël
126 % Fax: \mbox{+33 3 84 58 77 81}\\ % Dept Info
127 Email: \email{{ahmed.fanfakh_badri_muslim,jean-claude.charr,raphael.couturier,arnaud.giersch}@univ-fcomte.fr}
132 In recent years, green computing has become an important topic
133 in the supercomputing research domain. However, the
134 computing platforms are still consuming more and
135 more energy due to the increasing number of nodes composing
136 them. To minimize the operating costs of these platforms many
137 techniques have been used. Dynamic voltage and frequency
138 scaling (DVFS) is one of them. It can be used to reduce the power consumption of the CPU
139 while computing, by lowering its frequency. However, lowering the frequency of
140 a CPU may increase the execution time of an application running on that
141 processor. Therefore, the frequency that gives the best trade-off between
142 the energy consumption and the performance of an application must be selected.
143 In this paper, a new online frequency selecting algorithm for grids, composed of heterogeneous clusters, is presented.
144 It selects the frequencies and tries to give the best
145 trade-off between energy saving and performance degradation, for each node
146 computing the message passing application \textcolor{blue}{with iterations}.
147 The algorithm has a small
148 overhead and works without training or profiling. It uses a new energy model
149 for message passing applications \textcolor{blue}{with iterations} running on a grid.
150 The proposed algorithm is evaluated on a real grid, the Grid'5000 platform, while
151 running the NAS parallel benchmarks. The experiments on 16 nodes, distributed on three clusters, show that it reduces on average the
152 energy consumption by \np[\%]{30} while the performance is on average only degraded
153 by \np[\%]{3.2}. Finally, the algorithm is
154 compared to an existing method. The comparison results show that it outperforms the
155 latter in terms of energy consumption reduction and performance.
161 Dynamic voltage and frequency scaling \sep Grid computing\sep Green computing and frequency scaling online algorithm.
163 %% keywords here, in the form: keyword \sep keyword
165 %% MSC codes here, in the form: \MSC code \sep code
166 %% or \MSC[2008] code \sep code (2000 is the default)
174 \section{Introduction}
176 The need for more computing power is continually increasing. To partially
177 satisfy this need, most supercomputers constructors just put more computing
178 nodes in their platform. The resulting platforms may achieve higher floating
179 point operations per second (FLOPS), but the energy consumption and the heat
180 dissipation are also increased. As an example, the Chinese supercomputer
181 Tianhe-2 had the highest FLOPS in June 2015 according to the Top500 list
182 \cite{TOP500_Supercomputers_Sites}. However, it was also the most power hungry
183 platform with its over 3 million cores consuming around 17.8 megawatts.
184 Moreover, according to the U.S. annual energy outlook 2015
185 \cite{U.S_Annual.Energy.Outlook.2015}, the price of energy for 1 megawatt-hour
186 was approximately equal to \$70. Therefore, the price of the energy consumed by
187 the Tianhe-2 platform is approximately more than \$10 million each year. The
188 computing platforms must be more energy efficient and offer the highest number
189 of FLOPS per watt possible, such as the Shoubu-ExaScaler from RIKEN
190 which became the top of the Green500 list in June 2015 \cite{Green500_List}.
191 This heterogeneous platform executes more than 7 GFlops per watt while consuming
194 Besides platform improvements, there are many software and hardware techniques
195 to lower the energy consumption of these platforms, such as DVFS, scheduling \textcolor{blue}{and other techniques}.
196 DVFS is a widely used process to reduce the energy consumption of a
197 processor by lowering its frequency
198 \cite{Rizvandi_Some.Observations.on.Optimal.Frequency}. However, it also reduces
199 the number of FLOPS executed by the processor which may increase the execution
200 time of the application running over that processor. Therefore, researchers use
201 different optimization strategies to select the frequency that gives the best
202 trade-off between the energy reduction and performance degradation ratio. In
203 \cite{Our_first_paper} and \cite{pdsec2015}, a frequency selecting algorithm
204 was proposed to reduce the energy consumption of message passing
205 applications \textcolor{blue}{with iterations} running over homogeneous and heterogeneous clusters respectively.
206 The results of the experiments showed significant energy consumption
207 reductions. All the experimental results were conducted over the SimGrid
208 simulator \cite{SimGrid}, which offers easy tools to describe homogeneous and heterogeneous platforms, and to simulate the execution of message passing parallel
209 applications over them.
211 In this paper, a new frequency selecting algorithm, adapted to grid platforms
212 composed of heterogeneous clusters, is presented. It is applied to the NAS
213 parallel benchmarks and evaluated over a real testbed, the Grid'5000 platform
214 \cite{grid5000}. It selects for a grid platform running a message passing
215 application \textcolor{blue}{with iterations} the vector of frequencies that simultaneously tries to
216 offer the maximum energy reduction and minimum performance degradation
217 ratios. The algorithm has a very small overhead, works online and does not need
218 any training or profiling.
221 This paper is organized as follows: Section~\ref{sec.relwork} presents some
222 related works from other authors. Section~\ref{sec.exe} describes how the
223 execution time of message passing programs can be predicted. It also presents
224 an energy model that predicts the energy consumption of an application running
225 over a grid platform. Section~\ref{sec.compet} presents the
226 energy-performance objective function that maximizes the reduction of energy
227 consumption while minimizing the degradation of the program's performance.
228 Section~\ref{sec.optim} details the proposed frequencies selecting algorithm.
229 Section~\ref{sec.expe} presents the results of applying the algorithm on the
230 NAS parallel benchmarks and executing them on the Grid'5000 testbed.
231 It also evaluates the algorithm over multi-core per node architectures and over three different power scenarios. Moreover, it shows the
232 comparison results between the proposed method and an existing method. Finally,
233 in Section~\ref{sec.concl} the paper ends with a summary and some future works.
235 \section{Related works}
238 DVFS is a technique used in modern processors to scale down both the voltage and
239 the frequency of the CPU while computing, in order to reduce the energy
240 consumption of the processor. DVFS is also allowed in GPUs to achieve the same
241 goal. Reducing the frequency of a processor lowers its number of FLOPS and may
242 degrade the performance of the application running on that processor, especially
243 if it is compute bound. Therefore selecting the appropriate frequency for a
244 processor to satisfy some objectives, while taking into account all the
245 constraints, is not a trivial operation. Many researchers used different
246 strategies to tackle this problem. Some of them developed online methods that
247 compute the new frequency while executing the application, such
248 as~\cite{Hao_Learning.based.DVFS,Spiliopoulos_Green.governors.Adaptive.DVFS}.
249 Others used offline methods that may need to run the application and profile
250 it before selecting the new frequency, such
251 as~\cite{Rountree_Bounding.energy.consumption.in.MPI,Cochran_Pack_and_Cap_Adaptive_DVFS}.
252 The methods could be heuristics, exact or brute force methods that satisfy
253 varied objectives such as energy reduction or performance. They also could be
254 adapted to the execution's environment and the type of the application such as
255 sequential, parallel or distributed architecture, homogeneous or heterogeneous
256 platform, synchronous or asynchronous application.
258 In this paper, we are interested in reducing energy for message passing
259 synchronous applications \textcolor{blue}{with iterations} running over heterogeneous grid platforms. Some
260 works have already been done for such platforms and they can be classified into
261 two types of heterogeneous platforms:
263 \item the platform is composed of homogeneous GPUs and homogeneous CPUs.
264 \item the platform is only composed of heterogeneous CPUs.
267 For the first type of platform, the computing intensive parallel tasks are
268 executed on the GPUs and the rest are executed on the CPUs. Luley et
269 al.~\cite{Luley_Energy.efficiency.evaluation.and.benchmarking}, proposed a
270 heterogeneous cluster composed of Intel Xeon CPUs and NVIDIA GPUs. Their main
271 goal was to maximize the energy efficiency of the platform during computation by
272 maximizing the number of FLOPS per watt generated.
273 In~\cite{KaiMa_Holistic.Approach.to.Energy.Efficiency.in.GPU-CPU}, Kai Ma et
274 al. developed a scheduling algorithm that distributes workload proportional to
275 the computing power of the nodes which could be a GPU or a CPU. All the tasks
276 must be completed at the same time. In~\cite{Rong_Effects.of.DVFS.on.K20.GPU},
277 Rong et al. showed that a heterogeneous (GPUs and CPUs) cluster that enables
278 DVFS gave better energy and performance efficiency than other clusters only
281 The work presented in this paper concerns the second type of platform, with
282 heterogeneous CPUs. Many methods were conceived to reduce the energy
283 consumption of this type of platform. Naveen et
284 al.~\cite{Naveen_Power.Efficient.Resource.Scaling} developed a method that
285 minimizes the value of $\mathit{energy}\times \mathit{delay}^2$ (the delay is
286 the sum of slack times that happen during synchronous communications) by
287 dynamically assigning new frequencies to the CPUs of the heterogeneous cluster.
288 Lizhe et al.~\cite{Lizhe_Energy.aware.parallel.task.scheduling} proposed an
289 algorithm that divides the executed tasks into two types: the critical and non
290 critical tasks. The algorithm scales down the frequency of non critical tasks
291 proportionally to their slack and communication times while limiting the
292 performance degradation percentage to less than \np[\%]{10}.
293 In~\cite{Joshi_Blackbox.prediction.of.impact.of.DVFS}, they developed a
294 heterogeneous cluster composed of two types of Intel and AMD processors. They
295 use a gradient method to predict the impact of DVFS operations on performance.
296 In~\cite{Shelepov_Scheduling.on.Heterogeneous.Multicore} and
297 \cite{Li_Minimizing.Energy.Consumption.for.Frame.Based.Tasks}, the best
298 frequencies for a specified heterogeneous cluster are selected offline using
299 some heuristic. Chen et
300 al.~\cite{Chen_DVFS.under.quality.of.service.requirements} used a greedy dynamic
301 programming approach to minimize the power consumption of heterogeneous servers
302 while respecting given time constraints. This approach had considerable
303 overhead. In contrast to the above described papers, this paper presents the
304 following contributions :
306 \item two new energy and performance models for message passing
307 synchronous applications \textcolor{blue}{with iterations} running over a heterogeneous grid platform. Both models
308 take into account communication and slack times. The models can predict the
309 required energy and the execution time of the application.
311 \item a new online frequency selecting algorithm for heterogeneous grid
312 platforms. The algorithm has a very small overhead and does not need any
313 training nor profiling. It uses a new optimization function which
314 simultaneously maximizes the performance and minimizes the energy consumption
315 of a message passing synchronous application \textcolor{blue}{with iterations}.
321 \section{The performance and energy consumption measurements on heterogeneous grid architecture}
324 \subsection{The execution time of message passing distributed
325 applications \textcolor{blue}{with iterations} on a heterogeneous platform}
327 In this paper, we are interested in reducing the energy consumption of message
328 passing distributed synchronous applications \textcolor{blue}{with iterations} running over
329 heterogeneous grid platforms. A heterogeneous grid platform could be defined as a collection of
330 heterogeneous computing clusters interconnected via a long distance network which has lower bandwidth
331 and higher latency than the local networks of the clusters. Each computing cluster in the grid is composed of homogeneous nodes that are connected together via high speed network. Therefore, each cluster has different characteristics such as computing power (FLOPS), energy consumption, CPU's frequency range, network bandwidth and latency.
333 The overall execution time of a distributed synchronous application \textcolor{blue}{with iterations}
334 over a heterogeneous grid consists of the sum of the computation time and
335 the communication time for every iteration on a node.
336 \textcolor{blue}{However, nodes from distinct clusters in a grid have different computing powers, thus
337 while executing message passing \textcolor{blue}{with iterations} synchronous applications, fast nodes
338 have to wait for the slower ones to finish their computations before being able
339 to synchronously communicate with them as in Figure~\ref{fig:heter}. These
340 periods are called idle or slack times. }
342 overall execution time of the program is the execution time of the slowest task
343 which has the highest computation time and no slack time. \textcolor{blue}{For example, in Figure \ref{fig:heter} the task 1 is the slower task which has no slack time (not waits for the other nodes) and it is only has the communication times.}
347 \includegraphics[scale=0.6]{fig/commtasks}
348 \caption{Parallel tasks on a heterogeneous platform}
352 Dynamic Voltage and Frequency Scaling (DVFS) is a process, implemented in
353 modern processors, that reduces the energy consumption of a CPU by scaling
354 down its voltage and frequency. Since DVFS lowers the frequency of a CPU
355 and consequently its computing power, the execution time of a program running
356 over that scaled down processor may increase, especially if the program is
357 compute bound. The frequency reduction process can be expressed by the scaling
358 factor S which is the ratio between the maximum and the new frequency of a CPU
362 S = \frac{\Fmax}{\Fnew}
364 \textcolor{blue}{Where $\Fmax$ is the maximum frequency before applying DVFS and $\Fnew$ is the new frequency after applying DVFS.}
365 The execution time of a compute bound sequential program is linearly
366 proportional to the frequency scaling factor $S$. On the other hand, message
367 passing distributed applications consist of two parts: computation and
368 communication. The execution time of the computation part is linearly
369 proportional to the frequency scaling factor $S$ but the communication time is
370 not affected by the scaling factor because the processors involved remain idle
371 during the communications~\cite{Freeh_Exploring.the.Energy.Time.Tradeoff}. The
372 communication time for a task is the summation of periods of time that begin
373 with an MPI call for sending or receiving a message until the message is
374 synchronously sent or received.
376 Since in a heterogeneous grid each cluster has different characteristics,
377 especially different frequency gears, when applying DVFS operations on the nodes
378 of these clusters, they may get different scaling factors represented by a scaling vector:
379 $(S_{11}, S_{12},\dots, S_{NM_i})$ where $S_{ij}$ is the scaling factor of processor $j$ in cluster $i$ . To
380 be able to predict the execution time of message passing synchronous
381 applications \textcolor{blue}{with iterations} running over a heterogeneous grid, for different vectors of
382 scaling factors, the communication time and the computation time for all the
383 tasks must be measured during the first iteration before applying any DVFS
384 operation. Then the execution time for one iteration of the application with any
385 vector of scaling factors can be predicted using Equation (\ref{eq:perf}).
389 \Tnew = \mathop{\max_{i=1,\dots N}}_{j=1,\dots,M_i}({\TcpOld[ij]} \cdot S_{ij})
390 +\mathop{\min_{j=1,\dots,M_i}} (\Tcm[hj])
393 where $N$ is the number of clusters in the grid, $M_i$ is the number of nodes in
394 cluster $i$, $\TcpOld[ij]$ is the computation time of processor $j$ in the cluster $i$
395 and $\Tcm[hj]$ is the communication time of processor $j$ in the cluster $h$ during the
396 first iteration. The execution time for one iteration is equal to the sum of the maximum computation time for all nodes with the new scaling factors
397 and \textcolor{blue}{the communication time of the slower node without slack time during one iteration.
398 The slower node $h$ is the node that gives maximum execution time in all clusters befor scaling its frequency.}
399 It means that only the communication time without any slack time is taken into account.
400 Therefore, the execution time of the application \textcolor{blue}{with iterations} is equal to
401 the execution time of one iteration as in Equation (\ref{eq:perf}) multiplied by the
402 number of iterations of that application.
404 This prediction model is developed from the model to predict the execution time
405 of message passing distributed applications for homogeneous and heterogeneous clusters
406 ~\cite{Our_first_paper,pdsec2015}. \textcolor{blue}{where the homogeneous cluster predication model was used one scaling factor denoted as $S$, because all the nodes in the cluster have the same computing powers. Whereas, in heterogeneous cluster prediction model all the nodes have different scales and the scaling factors have denoted as one dimensional vector $(S_1, S_2, \dots, S_N)$. The execution time prediction model for a grid Equation \ref{eq:perf} defines a two dimensional array of scales
407 $(S_{11}, S_{12},\dots, S_{NM_i})$}. This model is used in the method to optimize both the energy consumption and the performance of iterative methods, which is presented in the following sections.
410 \subsection{Energy model for heterogeneous grid platform}
412 Many researchers~\cite{Malkowski_energy.efficient.high.performance.computing,
413 Rauber_Analytical.Modeling.for.Energy,Zhuo_Energy.efficient.Dynamic.Task.Scheduling,
414 Rizvandi_Some.Observations.on.Optimal.Frequency} divide the power consumed by
415 a processor into two power metrics: the static and the dynamic power. While the
416 first one is consumed as long as the computing unit is turned on, the latter is
417 only consumed during computation times. The dynamic power $\Pd$ is related to
418 the switching activity $\alpha$, load capacitance $\CL$, the supply voltage $V$
419 and operational frequency $F$, as shown in (\ref{eq:pd}).
422 \Pd = \alpha \cdot \CL \cdot V^2 \cdot F
424 The static power $\Ps$ captures the leakage power as follows:
427 \Ps = V \cdot \Ntrans \cdot \Kdesign \cdot \Ileak
429 where V is the supply voltage, $\Ntrans$ is the number of transistors,
430 $\Kdesign$ is a design dependent parameter and $\Ileak$ is a
431 technology dependent parameter. The energy consumed by an individual processor
432 to execute a given program can be computed as:
435 \Eind = \Pd \cdot \Tcp + \Ps \cdot T
437 where $T$ is the execution time of the program, $\Tcp$ is the computation
438 time and $\Tcp \le T$. $\Tcp$ may be equal to $T$ if there is no
439 communication and no slack time.
441 The main objective of DVFS operation is to reduce the overall energy
442 consumption~\cite{Le_DVFS.Laws.of.Diminishing.Returns}. The operational
443 frequency $F$ depends linearly on the supply voltage $V$, i.e., $V = \beta \cdot
444 F$ with some constant $\beta$. This equation is used to study the change of the
445 dynamic voltage with respect to various frequency values
446 in~\cite{Rauber_Analytical.Modeling.for.Energy}. The reduction process of the
447 frequency can be expressed by the scaling factor $S$ which is the ratio between
448 the maximum and the new frequency as in (\ref{eq:s}). The CPU governors are
449 power schemes supplied by the operating system's kernel to lower a core's
450 frequency. The new frequency $\Fnew$ from (\ref{eq:s}) can be calculated as
454 \Fnew = S^{-1} \cdot \Fmax
456 Replacing $\Fnew$ in (\ref{eq:pd}) as in (\ref{eq:fnew}) gives the following
457 equation for dynamic power consumption:
460 \PdNew = \alpha \cdot \CL \cdot V^2 \cdot \Fnew = \alpha \cdot \CL \cdot \beta^2 \cdot \Fnew^3 \\
461 {} = \alpha \cdot \CL \cdot V^2 \cdot \Fmax \cdot S^{-3} = \PdOld \cdot S^{-3}
463 where $\PdNew$ and $\PdOld$ are the dynamic power consumed with the
464 new frequency and the maximum frequency respectively.
466 According to (\ref{eq:pdnew}) the dynamic power is reduced by a factor of
467 $S^{-3}$ when reducing the frequency by a factor of
468 $S$~\cite{Rauber_Analytical.Modeling.for.Energy}. Since the FLOPS of a CPU is
469 proportional to the frequency of a CPU, the computation time is increased
470 proportionally to $S$. The new dynamic energy is the dynamic power multiplied
471 by the new time of computation and is given by the following equation:
474 \EdNew = \PdOld \cdot S^{-3} \cdot (\Tcp \cdot S)= S^{-2}\cdot \PdOld \cdot \Tcp
476 The static power is related to the power leakage of the CPU and is consumed
477 during computation and even when idle. As
478 in~\cite{Rauber_Analytical.Modeling.for.Energy, Zhuo_Energy.efficient.Dynamic.Task.Scheduling},
479 the static power of a processor is considered as constant during idle and
480 computation periods, and for all its available frequencies. The static energy
481 is the static power multiplied by the execution time of the program. According
482 to the execution time model in (\ref{eq:perf}), the execution time of the
483 program is the sum of the computation and the communication times. The
484 computation time is linearly related to the frequency scaling factor, while this
485 scaling factor does not affect the communication time. The static energy of a
486 processor after scaling its frequency is computed as follows:
489 \Es = \Ps \cdot (\Tcp \cdot S + \Tcm)
492 In the considered heterogeneous grid platform, each node $j$ in cluster $i$ may have
493 different dynamic and static powers from the nodes of the other clusters,
494 noted as $\Pd[ij]$ and $\Ps[ij]$ respectively. \textcolor{blue}{Therefore, even if the distributed
495 message passing application \textcolor{blue}{with iterations} is load balanced, the computation time of each CPU $j$
496 in cluster $i$ noted $\Tcp[ij]$ may be slightly different due to the delay caused by the scheduler of the operating system}. Therefore, different frequency scaling factors may be
497 computed in order to decrease the overall energy consumption of the application
498 and reduce the slack times. The communication time of a processor $j$ in cluster $i$ is noted as
499 $\Tcm[ij]$ and could contain slack times when communicating with slower nodes,
500 see Figure~\ref{fig:heter}. Therefore, all nodes do not have equal
501 communication times. While the dynamic energy is computed according to the
502 frequency scaling factor and the dynamic power of each node as in
503 (\ref{eq:Edyn}), the static energy is computed as the sum of the execution time
504 of one iteration multiplied by the static power of each processor.
505 \textcolor{blue}{ The CPU during the communication times consumes only the static power. While
506 in the computation times, it consumes both the dynamic and the static power refer to \cite{Freeh_Exploring.the.Energy.Time.Tradeoff}.}
507 The overall energy consumption of a message passing distributed application executed over a
508 heterogeneous grid platform during one iteration is the summation of all dynamic and
509 static energies for $M_i$ processors in $N$ clusters. It is computed as follows:
512 E = \sum_{i=1}^{N} \sum_{i=1}^{M_i} {(S_{ij}^{-2} \cdot \Pd[ij] \cdot \Tcp[ij])} +
513 \sum_{i=1}^{N} \sum_{j=1}^{M_i} (\Ps[ij] \cdot {} \\
514 (\mathop{\max_{i=1,\dots N}}_{j=1,\dots,M_i}({\Tcp[ij]} \cdot S_{ij})
515 +\mathop{\min_{j=1,\dots M_i}} (\Tcm[hj]) ))
519 Reducing the frequencies of the processors according to the vector of scaling
520 factors $(S_{11}, S_{12},\dots, S_{NM_i})$ may degrade the performance of the application
521 and thus, increase the static energy because the execution time is
522 increased~\cite{Kim_Leakage.Current.Moore.Law}. The overall energy consumption
523 for the application \textcolor{blue}{with iterations} can be measured by measuring the energy
524 consumption for one iteration as in (\ref{eq:energy}) multiplied by the number
525 of iterations of that application.
527 \section{Optimization of both energy consumption and performance}
530 Using the lowest frequency for each processor does not necessarily give the most
531 energy efficient execution of an application. Indeed, even though the dynamic
532 power is reduced while scaling down the frequency of a processor, its
533 computation power is proportionally decreased. Hence, the execution time might
534 be drastically increased and during that time, dynamic and static powers are
535 being consumed. Therefore, it might cancel any gains achieved by scaling down
536 the frequency of all nodes to the minimum and the overall energy consumption of
537 the application might not be the optimal one. It is not trivial to select the
538 appropriate frequency scaling factor for each processor while considering the
539 characteristics of each processor (computation power, range of frequencies,
540 dynamic and static powers) and the task executed (computation/communication
541 ratio). The aim being to reduce the overall energy consumption and to avoid
542 increasing significantly the execution time.
544 works, \cite{Our_first_paper} and \cite{pdsec2015}, two methods that select the optimal
545 frequency scaling factors for a homogeneous and a heterogeneous cluster respectively, were proposed.
546 Both methods selects the frequencies that gives the best trade-off between
547 energy consumption reduction and performance for message passing
548 synchronous applications \textcolor{blue}{with iterations}. In this work we
549 are interested in grids that are composed of heterogeneous clusters, \textcolor{blue}{where} the nodes
550 have different characteristics such as dynamic power, static power, computation power,
551 frequencies range, network latency and bandwidth.
552 Due to the heterogeneity of the processors, a vector of scaling factors should be selected
553 and it must give the best trade-off between energy consumption and performance.
555 The relation between the energy consumption and the execution time for an
556 application is complex and nonlinear, Thus, unlike the relation between the
557 execution time and the scaling factor, the relation between the energy and the
558 frequency scaling factors is nonlinear, for more details refer
559 to~\cite{Freeh_Exploring.the.Energy.Time.Tradeoff}. Moreover, these relations
560 are not measured using the same metric. To solve this problem, the execution
561 time is normalized by computing the ratio between the new execution time (after
562 scaling down the frequencies of some processors) and the initial one (with
563 maximum frequency for all nodes) as follows:
567 \Pnorm = \frac{\Tnew}{\Told}
570 where $Tnew$ is computed as in (\ref{eq:perf}) and $Told$ is computed as in (\ref{eq:told}).
574 \Told = \mathop{\max_{i=1,\dots N}}_{j=1,\dots,M_i}({\TcpOld[ij]} )
575 +\mathop{\min_{j=1,\dots,M_i}} (\Tcm[hj])
578 In the same way, the energy is normalized by computing the ratio between the
579 consumed energy while scaling down the frequency and the consumed energy with
580 maximum frequency for all nodes:
584 \Enorm = \frac{\Ereduced}{\Eoriginal}
587 where $\Ereduced$ is computed using (\ref{eq:energy}) and $\Eoriginal$ is
588 computed as in (\ref{eq:eorginal}).
592 \Eoriginal = \sum_{i=1}^{N} \sum_{j=1}^{M_i} ( \Pd[ij] \cdot \Tcp[ij]) +
593 \mathop{\sum_{i=1}^{N}} \sum_{j=1}^{M_i} (\Ps[ij] \cdot \Told)
596 While the main goal is to optimize the energy and execution time at the same
597 time, the normalized energy and execution time curves do not evolve (increase/decrease) in the same way.
598 According to (\ref{eq:pnorm}) and (\ref{eq:enorm}), the
599 vector of frequency scaling factors $S_1,S_2,\dots,S_N$ reduces both the energy
600 and the execution time, but the main objective is to produce
601 maximum energy reduction with minimum execution time reduction.
603 This problem can be solved by making the optimization process for energy and
604 execution time follow the same evolution according to the vector of scaling factors
605 $(S_{11}, S_{12},\dots, S_{NM})$. Therefore, the equation of the
606 normalized execution time is inverted which gives the normalized performance
607 equation, as follows:
610 \Pnorm = \frac{\Told}{\Tnew}
615 \subfloat[Homogeneous cluster]{%
616 \includegraphics[width=.48\textwidth]{fig/homo}\label{fig:r1}} \hspace{0.4cm}%
617 \subfloat[Heterogeneous grid]{%
618 \includegraphics[width=.48\textwidth]{fig/heter}\label{fig:r2}}
620 \caption{The energy and performance relation}
623 Then, the objective function can be modeled in order to find the maximum
624 distance between the energy curve (\ref{eq:enorm}) and the performance curve
625 (\ref{eq:pnorm_inv}) over all available sets of scaling factors. This
626 represents the minimum energy consumption with minimum execution time (maximum
627 performance) at the same time, see Figure~\ref{fig:r1} and
628 Figure~\ref{fig:r2}. Then the objective function has the following form:
632 \mathop{ \mathop{\max_{i=1,\dots N}}_{j=1,\dots,M_i}}_{k=1,\dots,F_j}
633 (\overbrace{\Pnorm(S_{ijk})}^{\text{Maximize}} -
634 \overbrace{\Enorm(S_{ijk})}^{\text{Minimize}} )
636 where $N$ is the number of clusters, $M_i$ is the number of nodes in the cluster $i$ and
637 $F_j$ is the number of available frequencies in the node $j$. Then, the optimal set
638 of scaling factors that satisfies (\ref{eq:max}) can be selected.
639 The objective function can work with any energy model or any power
640 values for each node (static and dynamic powers). However, the most important
641 energy reduction gain can be achieved when the energy curve has a convex form as shown
642 in~\cite{Zhuo_Energy.efficient.Dynamic.Task.Scheduling,Rauber_Analytical.Modeling.for.Energy,Hao_Learning.based.DVFS}.
644 \section{The scaling factors selection algorithm for grids }
649 \begin{algorithmic}[1]
654 \item [{$N$}] number of clusters in the grid.
655 \item [{$M$}] number of nodes in each cluster.
656 \item[{$\Tcp[ij]$}] array of all computation times for all nodes during one iteration and with the highest frequency.
657 \item[{$\Tcm[ij]$}] array of all communication times for all nodes during one iteration and with the highest frequency.
658 \item[{$\Fmax[ij]$}] array of the maximum frequencies for all nodes.
659 \item[{$\Pd[ij]$}] array of the dynamic powers for all nodes.
660 \item[{$\Ps[ij]$}] array of the static powers for all nodes.
661 \item[{$\Fdiff[ij]$}] array of the differences between two successive frequencies for all nodes.
663 \Ensure $\Sopt[11],\Sopt[12] \dots, \Sopt[NM_i]$, a vector of scaling factors that gives the optimal trade-off between energy consumption and execution time
665 \State $\Scp[ij] \gets \frac{\max_{i=1,2,\dots,N}(\max_{j=1,2,\dots,M_i}(\Tcp[ij]))}{\Tcp[ij]} $
666 \State $F_{ij} \gets \frac{\Fmax[ij]}{\Scp[i]},~{i=1,2,\cdots,N},~{j=1,2,\dots,M_i}.$
667 \State Round the computed initial frequencies $F_i$ to the closest available frequency for each node.
668 \If{(not the first frequency)}
669 \State $F_{ij} \gets F_{ij}+\Fdiff[ij],~i=1,\dots,N,~{j=1,\dots,M_i}.$
671 \State $\Told \gets $ computed as in Equation \ref{eq:told}.
672 \State $\Eoriginal \gets $ computed as in Equation \ref{eq:eorginal}.
673 \State $\Sopt[ij] \gets 1,~i=1,\dots,N,~{j=1,\dots,M_i}. $
674 \State $\Dist \gets 0 $
675 \While {(all nodes have not reached their minimum \newline\hspace*{2.5em} frequency \textbf{or} $\Pnorm - \Enorm < 0 $)}
676 \If{(not the last freq. \textbf{and} not the slowest node)}
677 \State $F_{ij} \gets F_{ij} - \Fdiff[ij],~{i=1,\dots,N},~{j=1,\dots,M_i}$.
678 \State $S_{ij} \gets \frac{\Fmax[ij]}{F_{ij}},~{i=1,\dots,N},~{j=1,\dots,M_i}.$
680 \State $\Tnew \gets $ computed as in Equation \ref{eq:perf}.
681 \State $\Ereduced \gets $ computed as in Equation \ref{eq:energy}.
682 \State $\Pnorm \gets \frac{\Told}{\Tnew}$, $\Enorm\gets \frac{\Ereduced}{\Eoriginal}$
683 \If{$(\Pnorm - \Enorm > \Dist)$}
684 \State $\Sopt[ij] \gets S_{ij},~i=1,\dots,N,~j=1,\dots,M_i. $
685 \State $\Dist \gets \Pnorm - \Enorm$
688 \State Return $\Sopt[11],\Sopt[12],\dots,\Sopt[NM_i]$
690 \caption{Scaling factors selection algorithm}
695 \begin{algorithmic}[1]
697 \For {$k=1$ to \textit{some iterations}}
698 \State Computations section.
699 \State Communications section.
701 \State Gather all times of computation and communication from each node.
702 \State Call Algorithm \ref{HSA}.
703 \State Compute the new frequencies from the\newline\hspace*{3em}%
704 returned optimal scaling factors.
705 \State Set the new frequencies to nodes.
709 \caption{DVFS algorithm}
714 In this section, the scaling factors selection algorithm for grids, Algorithm~\ref{HSA},
715 is presented. It selects the vector of the frequency
716 scaling factors that gives the best trade-off between minimizing the
717 energy consumption and maximizing the performance of a message passing
718 synchronous application \textcolor{blue}{with iterations} executed on a grid. It works
719 online during the execution time of the message passing program \textcolor{blue}{with iterations}. It
720 uses information gathered during the first iteration such as the computation
721 time and the communication time in one iteration for each node. The algorithm is
722 executed after the first iteration and returns a vector of optimal frequency
723 scaling factors that satisfies the objective function (\ref{eq:max}). The
724 program applies DVFS operations to change the frequencies of the CPUs according
725 to the computed scaling factors. This algorithm is called just once during the
726 execution of the program. Algorithm~\ref{dvfs} shows where and when the proposed
727 scaling algorithm is called in the MPI program \textcolor{blue}{with iterations}.
731 \includegraphics[scale=0.6]{fig/init_freq}
732 \caption{Selecting the initial frequencies in a grid platform}
738 The algorithm takes into account this
739 problem and tries to reduce these slack times when selecting the vector of the frequency
740 scaling factors. At first, it selects initial frequency scaling factors
741 that increase the execution times of fast nodes and minimize the differences
742 between the computation times of fast and slow nodes. The value of the initial
743 frequency scaling factor for each node is inversely proportional to its
744 computation time that was gathered from the first iteration. These initial
745 frequency scaling factors are computed as a ratio between the computation time
746 of the slowest node and the computation time of the node $i$ as follows:
749 \Scp[ij] = \frac{ \mathop{\max\limits_{i=1,\dots N}}\limits_{j=1,\dots,M_i}(\Tcp[ij])} {\Tcp[ij]}
751 Using the initial frequency scaling factors computed in (\ref{eq:Scp}), the
752 algorithm computes the initial frequencies for all nodes as a ratio between the
753 maximum frequency of node $i$ and the computation scaling factor $\Scp[i]$ as
757 F_{ij} = \frac{\Fmax[ij]}{\Scp[ij]},~{i=1,2,\dots,N},~{j=1,\dots,M_i}
759 If the computed initial frequency for a node is not available in the gears of
760 that node, it is replaced by the nearest available frequency. In
761 Figure~\ref{fig:st_freq}, the nodes are sorted by their computing powers in
762 ascending order and the frequencies of the faster nodes are scaled down
763 according to the computed initial frequency scaling factors. The resulting new
764 frequencies are highlighted in Figure~\ref{fig:st_freq}. This set of
765 frequencies can be considered as a higher bound for the search space of the
766 optimal vector of frequencies because selecting higher frequencies
767 than the higher bound will not improve the performance of the application and it
768 will increase its overall energy consumption. Therefore the algorithm that
769 selects the frequency scaling factors starts the search method from these
770 initial frequencies and takes a downward search direction toward lower
771 frequencies until reaching the nodes' minimum frequencies or lower bounds. A node's frequency is considered its lower bound if the computed distance between the energy and performance at this frequency is less than zero.
772 A negative distance means that the performance degradation ratio is higher than the energy saving ratio.
773 In this situation, the algorithm must stop the downward search because it has reached the lower bound and it is useless to test the lower frequencies. Indeed, they will all give worse distances.
775 Therefore, the algorithm iterates on all remaining frequencies, from the higher
776 bound until all nodes reach their minimum frequencies or their lower bounds, to compute the overall
777 energy consumption and performance and selects the optimal vector of the frequency scaling
778 factors. At each iteration the algorithm determines the slowest node
779 according to Equation~\ref{eq:perf} and keeps its frequency unchanged,
780 while it lowers the frequency of all other nodes by one gear. The new overall
781 energy consumption and execution time are computed according to the new scaling
782 factors. The optimal set of frequency scaling factors is the set that gives the
783 highest distance according to the objective function~\ref{eq:max}.
785 Figures~\ref{fig:r1} and \ref{fig:r2} illustrate the normalized performance and
786 consumed energy for an application running on a homogeneous cluster and a
787 grid platform respectively while increasing the scaling factors. It can
788 be noticed that in a homogeneous cluster the search for the optimal scaling
789 factor should start from the maximum frequency because the performance and the
790 consumed energy decrease from the beginning of the plot. On the other hand, in
791 the grid platform the performance is maintained at the beginning of the
792 plot even if the frequencies of the faster nodes decrease until the computing
793 power of scaled down nodes are lower than the slowest node. It can also be noticed that the higher the difference between the faster nodes and the slower nodes is, the bigger the maximum distance between the energy curve and the performance curve is, which results in bigger energy savings.
796 \section{Experimental results}
798 While in~\cite{pdsec2015} the energy model and the scaling factors selection algorithm were applied to a heterogeneous cluster and evaluated over the SimGrid simulator~\cite{SimGrid},
799 in this paper real experiments were conducted over the Grid'5000 platform.
801 \subsection{Grid'5000 architecture and power consumption}
803 Grid'5000~\cite{grid5000} is a large-scale testbed that consists of ten sites distributed all over metropolitan France and Luxembourg. All the sites are connected together via a special long distance network called RENATER,
804 which is the French National Telecommunication Network for Technology.
805 Each site of the grid is composed of a few heterogeneous
806 computing clusters and each cluster contains many homogeneous nodes. In total,
807 Grid'5000 has about one thousand heterogeneous nodes and eight thousand cores. In each site,
808 the clusters and their nodes are connected via high speed local area networks.
809 Two types of local networks are used, Ethernet or Infiniband networks which have different characteristics in terms of bandwidth and latency.
811 Since Grid'5000 is dedicated to testing, contrary to production grids it allows a user to deploy its own customized operating system on all the booked nodes. The user could have root rights and thus apply DVFS operations while executing a distributed application. Moreover, the Grid'5000 testbed provides at some sites a power measurement tool to capture
812 the power consumption for each node in those sites. The measured power is the overall consumed power by all the components of a node at a given instant, such as CPU, hard drive, main-board and memory. For more details refer to
813 \cite{Energy_measurement}. In order to correctly measure the CPU power of one core in a node $j$,
814 firstly, the power consumed by the node while being idle at instant $y$, noted as $\Pidle[jy]$, was measured. Then, the power was measured while running a single thread benchmark with no communication (no idle time) over the same node with its CPU scaled to the maximum available frequency. The latter power measured at time $x$ with maximum frequency for one core of node $j$ is noted $\Pmax[jx]$. The difference between the two measured power consumptions represents the
815 dynamic power consumption of that core with the maximum frequency, see Figure~\ref{fig:power_cons}.
818 The dynamic power $\Pd[j]$ is computed as in Equation~\ref{eq:pdyn}
821 \Pd[j] = \max_{x=\beta_1,\dots \beta_2} (\Pmax[jx]) - \min_{y=\Theta_1,\dots \Theta_2} (\Pidle[jy])
824 where $\Pd[j]$ is the dynamic power consumption for one core of node $j$,
825 $\lbrace \beta_1,\beta_2 \rbrace$ is the time interval for the measured maximum power values,
826 $\lbrace\Theta_1,\Theta_2\rbrace$ is the time interval for the measured idle power values.
827 Therefore, the dynamic power of one core is computed as the difference between the maximum
828 measured value in maximum powers vector and the minimum measured value in the idle powers vector.
830 On the other hand, the static power consumption by one core is a part of the measured idle power consumption of the node. Since in Grid'5000 there is no way to measure precisely the consumed static power and in~\cite{Our_first_paper,pdsec2015,Rauber_Analytical.Modeling.for.Energy} it was assumed that the static power represents a ratio of the dynamic power, the value of the static power is assumed as 20\% of dynamic power consumption of the core.
832 In the experiments presented in the following sections, two sites of Grid'5000 were used, Lyon and Nancy sites. These two sites have in total seven different clusters as shown on Figure~\ref{fig:grid5000}.
834 Four clusters from the two sites were selected in the experiments: one cluster from
835 Lyon's site, Taurus, and three clusters from Nancy's site, Graphene,
836 Griffon and Graphite. Each one of these clusters has homogeneous nodes inside, while nodes from different clusters are heterogeneous in many aspects such as: computing power, power consumption, available
837 frequency ranges and local network features: the bandwidth and the latency. Table~\ref{table:grid5000} shows
838 the detailed characteristics of these four clusters. Moreover, the dynamic powers were computed using Equation~\ref{eq:pdyn} for all the nodes in the
839 selected clusters and are presented in Table~\ref{table:grid5000}.
844 \includegraphics[scale=1]{fig/grid5000}
845 \caption{The selected two sites of Grid'5000}
850 \includegraphics[scale=0.6]{fig/power_consumption.pdf}
851 \caption{The power consumption by one core from the Taurus cluster}
852 \label{fig:power_cons}
856 The energy model and the scaling factors selection algorithm were applied to the NAS parallel benchmarks v3.3 \cite{NAS.Parallel.Benchmarks} and evaluated over Grid'5000.
857 The benchmark suite contains seven applications: CG, MG, EP, LU, BT, SP and FT. \textcolor{blue}{These benchmarks are message passing applications with iterations compute
858 the same block of operations several times, starting from the initial solution until reaching
859 the acceptable approximation of the exact solution.}
860 These applications have different computations and communications ratios and strategies which make them good testbed applications to evaluate the proposed algorithm and energy model.
861 The benchmarks have seven different classes, S, W, A, B, C, D and E, that represent the size of the problem that the method solves. In this work, class D was used for all benchmarks in all the experiments presented in the next sections.
866 \caption{The characteristics of the CPUs in the selected clusters}
869 \begin{tabular}{|*{7}{c|}}
871 & & Max & Min & Diff. & & \\
872 Cluster & CPU & Freq. & Freq. & Freq. & Cores & Dynamic power \\
873 Name & model & GHz & GHz & GHz & per CPU & of one core \\
876 Taurus & Xeon & 2.3 & 1.2 & 0.1 & 6 & \np[W]{35} \\
877 & E5-2630 & & & & & \\
880 Graphene & Xeon & 2.53 & 1.2 & 0.133 & 4 & \np[W]{23} \\
884 Griffon & Xeon & 2.5 & 2 & 0.5 & 4 & \np[W]{46} \\
888 Graphite & Xeon & 2 & 1.2 & 0.1 & 8 & \np[W]{35} \\
889 & E5-2650 & & & & & \\
892 \label{table:grid5000}
897 \subsection{The experimental results of the scaling algorithm}
899 In this section, the results of the application of the scaling factors selection algorithm \ref{HSA}
900 to the NAS parallel benchmarks are presented. \textcolor{blue}{Each experiment of this section and next sections has been executed many times and the results presented in the figures are the average values of many execution.}
902 As mentioned previously, the experiments
903 were conducted over two sites of Grid'5000, Lyon and Nancy sites.
904 Two scenarios were considered while selecting the clusters from these two sites :
906 \item In the first scenario, nodes from two sites and three heterogeneous clusters were selected. The two sites are connected
907 via a long distance network.
908 \item In the second scenario nodes from three clusters located in one site, Nancy site, were selected.
912 for using these two scenarios is to evaluate the influence of long distance communications (higher latency) on the performance of the
913 scaling factors selection algorithm. Indeed, in the first scenario the computations to communications ratio
914 is very low due to the higher communication times which reduce the effect of DVFS operations.
916 The NAS parallel benchmarks are executed over
917 16 and 32 nodes for each scenario. The number of participating computing nodes from each cluster
918 is different because all the selected clusters do not have the same available number of nodes and all benchmarks do not require the same number of computing nodes.
919 Table~\ref{tab:sc} shows the number of nodes used from each cluster for each scenario.
923 \caption{The different grid scenarios}
925 \begin{tabular}{|*{4}{c|}}
927 \multirow{2}{*}{Scenario name} & \multicolumn{3}{c|} {The participating clusters} \\ \cline{2-4}
928 & Cluster & Site & Nodes per cluster \\
930 \multirow{3}{*}{Two sites / 16 nodes} & Taurus & Lyon & 5 \\ \cline{2-4}
931 & Graphene & Nancy & 5 \\ \cline{2-4}
932 & Griffon & Nancy & 6 \\
934 \multirow{3}{*}{Tow sites / 32 nodes} & Taurus & Lyon & 10 \\ \cline{2-4}
935 & Graphene & Nancy & 10 \\ \cline{2-4}
936 & Griffon &Nancy & 12 \\
938 \multirow{3}{*}{One site / 16 nodes} & Graphite & Nancy & 4 \\ \cline{2-4}
939 & Graphene & Nancy & 6 \\ \cline{2-4}
940 & Griffon & Nancy & 6 \\
942 \multirow{3}{*}{One site / 32 nodes} & Graphite & Nancy & 4 \\ \cline{2-4}
943 & Graphene & Nancy & 14 \\ \cline{2-4}
944 & Griffon & Nancy & 14 \\
952 \subfloat[The energy consumption by the nodes wile executing the NAS benchmarks over different scenarios
954 \includegraphics[width=.48\textwidth]{fig/eng_con_scenarios.eps}\label{fig:eng_sen}} \hspace{0.4cm}%
955 \subfloat[The execution times of the NAS benchmarks over different scenarios]{%
956 \includegraphics[width=.48\textwidth]{fig/time_scenarios.eps}\label{fig:time_sen}}
957 \label{fig:exp-time-energy}
958 \caption{The energy consumption and execution time of NAS Benchmarks over different scenarios}
961 The NAS parallel benchmarks are executed over these two platforms
962 with different number of nodes, as in Table~\ref{tab:sc}.
963 The overall energy consumption of all the benchmarks solving the class D instance and
964 using the proposed frequency selection algorithm is measured
965 using the equation of the reduced energy consumption, Equation~\ref{eq:energy}. This model uses the measured dynamic power showed in Table~\ref{table:grid5000}
967 power is assumed to be equal to 20\% of the dynamic power \textcolor{blue}{as in \cite{Rauber_Analytical.Modeling.for.Energy}}. The execution
968 time is measured for all the benchmarks over these different scenarios.
970 The energy consumptions and the execution times for all the benchmarks are
971 presented in Figures~\ref{fig:eng_sen} and \ref{fig:time_sen} respectively.
973 For the majority of the benchmarks, the energy consumed while executing the NAS benchmarks over one site scenario
974 for 16 and 32 nodes is lower than the energy consumed while using two sites.
975 The long distance communications between the two distributed sites increase the idle time, which leads to more static energy consumption.
977 The execution times of these benchmarks
978 over one site with 16 and 32 nodes are also lower than those of the two sites
979 scenario. Moreover, most of the benchmarks running over the one site scenario have their execution times approximately halved when the number of computing nodes is doubled from 16 to 32 nodes (linear speed up according to the number of the nodes).
981 However, the execution times and the energy consumptions of the EP and MG
982 benchmarks, which have no or small communications, are not significantly
983 affected in both scenarios, even when the number of nodes is doubled. On the
984 other hand, the communication times of the rest of the benchmarks increase when
985 using long distance communications between two sites or when increasing the number of
989 The energy saving percentage is computed as the ratio between the reduced
990 energy consumption, Equation~\ref{eq:energy}, and the original energy consumption,
991 Equation~\ref{eq:eorginal}, for all benchmarks as in Figure~\ref{fig:eng_s}.
992 This figure shows that the energy saving percentages of one site scenario for
993 16 and 32 nodes are bigger than those of the two sites scenario which is due
994 to the higher computations to communications ratio in the first scenario
995 than in the second one. Moreover, the frequency selecting algorithm selects smaller frequencies when the computation times are bigger than the communication times which
996 results in a lower energy consumption. Indeed, the dynamic consumed power
997 is exponentially related to the CPU's frequency value. On the other hand, the increase in the number of computing nodes can
998 increase the communication times and thus produces less energy saving depending on the
999 benchmarks being executed. The results of benchmarks CG, MG, BT and FT show more
1000 energy saving percentage in the one site scenario when executed over 16 nodes than over 32 nodes. LU and SP consume more energy with 16 nodes than 32 in one site because their computations to communications ratio is not affected by the increase of the number of local communications.
1004 \subfloat[The energy reduction while executing the NAS benchmarks over different scenarios ]{%
1005 \includegraphics[width=.48\textwidth]{fig/eng_s.eps}\label{fig:eng_s}} \hspace{0.4cm}%
1006 \subfloat[The performance degradation of the NAS benchmarks over different scenarios]{%
1007 \includegraphics[width=.48\textwidth]{fig/per_d.eps}\label{fig:per_d}}\hspace{0.4cm}%
1008 \subfloat[The trade-off distance between the energy reduction and the performance of the NAS benchmarks
1009 over different scenarios]{%
1010 \includegraphics[width=.48\textwidth]{fig/dist.eps}\label{fig:dist}}
1012 \caption{The experimental results of different scenarios}
1017 The energy saving percentage is reduced for all the benchmarks because of the long distance communications in the two sites
1018 scenario, except for the EP benchmark which has no communication. Therefore, the energy saving percentage of this benchmark is
1019 dependent on the maximum difference between the computing powers of the heterogeneous computing nodes, for example
1020 in the one site scenario, the graphite cluster is selected but in the two sites scenario
1021 this cluster is replaced with the Taurus cluster which is more powerful.
1022 Therefore, the energy savings of the EP benchmark are bigger in the two sites scenario due
1023 to the higher maximum difference between the computing powers of the nodes.
1025 In fact, high differences between the nodes' computing powers make the proposed frequencies selecting
1026 algorithm select smaller frequencies for the powerful nodes which
1027 produces less energy consumption and thus more energy saving.
1028 The best energy saving percentage was obtained in the one site scenario with 16 nodes, the energy consumption was on average reduced up to 30\%.
1031 Figure \ref{fig:per_d} presents the performance degradation percentages for all benchmarks over the two scenarios.
1032 The performance degradation percentage for the benchmarks running on two sites with
1033 16 or 32 nodes is on average equal to 8.3\% or 4.7\% respectively.
1034 For this scenario, the proposed scaling algorithm selects smaller frequencies for the executions with 32 nodes without significantly degrading their performance because the communication times are higher with 32 nodes which results in smaller computations to communications ratio. On the other hand, the performance degradation percentage for the benchmarks running on one site with
1035 16 or 32 nodes is on average equal to 3.2\% and 10.6\% respectively. In contrary to the two sites scenario, when the number of computing nodes is increased in the one site scenario, the performance degradation percentage is increased. Therefore, doubling the number of computing
1036 nodes when the communications occur in high speed network does not decrease the computations to
1037 communication ratio.
1039 The performance degradation percentage of the EP benchmark after applying the scaling factors selection algorithm is the highest in comparison to
1040 the other benchmarks. Indeed, in the EP benchmark, there are no communication and slack times and its
1041 performance degradation percentage only depends on the frequencies values selected by the algorithm for the computing nodes.
1042 The rest of the benchmarks showed different performance degradation percentages which decrease
1043 when the communication times increase and vice versa.
1045 Figure \ref{fig:dist} presents the distance percentage between the energy saving and the performance degradation for each benchmark over both scenarios. The trade-off distance percentage can be
1046 computed as in Equation~\ref{eq:max}. The one site scenario with 16 nodes gives the best energy and performance
1047 trade-off, on average it is equal to 26.8\%. The one site scenario using both 16 and 32 nodes had better energy and performance
1048 trade-off comparing to the two sites scenario because the former has high speed local communications
1049 which increase the computations to communications ratio and the latter uses long distance communications which decrease this ratio.
1051 Finally, the best energy and performance trade-off depends on all of the following:
1052 1) the computations to communications ratio when there are communications and slack times, 2) the heterogeneity of the computing powers of the nodes and 3) the heterogeneity of the consumed static and dynamic powers of the nodes.
1057 \subsection{The experimental results over multi-core clusters}
1060 The clusters of Grid'5000 have different number of cores embedded in their nodes
1061 as shown in Table~\ref{table:grid5000}. In
1062 this section, the proposed scaling algorithm is evaluated over the Grid'5000 platform while using multi-cores nodes selected according to the one site scenario described in Section~\ref{sec.res}.
1063 The one site scenario uses 32 cores from multi-core nodes instead of 32 distinct nodes. For example if
1064 the participating number of cores from a certain cluster is equal to 14,
1065 in the multi-core scenario 4 nodes are selected and
1066 3 or 4 cores from each node are used. The platforms with one
1067 core per node and multi-core nodes are shown in Table~\ref{table:sen-mc}.
1068 The energy consumptions and execution times of running the class D of the NAS parallel
1069 benchmarks over these two different platforms are presented
1070 in Figures \ref{fig:eng-cons-mc} and \ref{fig:time-mc} respectively.
1075 \caption{The multi-core scenarios}
1076 \begin{tabular}{|*{4}{c|}}
1078 Scenario name & Cluster name & Nodes per cluster &
1079 Cores per node \\ \hline
1080 \multirow{3}{*}{One core per node} & Graphite & 4 & 1 \\ \cline{2-4}
1081 & Graphene & 14 & 1 \\ \cline{2-4}
1082 & Griffon & 14 & 1 \\ \hline
1083 \multirow{3}{*}{Multi-core per node} & Graphite & 1 & 4 \\ \cline{2-4}
1084 & Graphene & 4 & 3 or 4 \\ \cline{2-4}
1085 & Griffon & 4 & 3 or 4 \\ \hline
1087 \label{table:sen-mc}
1093 \subfloat[Comparing the execution times of running the NAS benchmarks over one core and multi-core scenarios]{%
1094 \includegraphics[width=.48\textwidth]{fig/time.eps}\label{fig:time-mc}} \hspace{0.4cm}%
1095 \subfloat[Comparing the energy consumptions of running the NAS benchmarks over one core and multi-core scenarios]{%
1096 \includegraphics[width=.48\textwidth]{fig/eng_con.eps}\label{fig:eng-cons-mc}}
1097 \label{fig:eng-cons}
1098 \caption{The energy consumptions and execution times of the NAS benchmarks running over one core and multi-core per node architectures}
1103 The execution times for most of the NAS benchmarks are higher over the multi-core per node scenario
1104 than over the single core per node scenario. Indeed,
1105 the communication times are higher in the one site multi-core scenario than in the latter scenario because all the cores of a node share the same node network link which can be saturated when running communication bound applications. Moreover, the cores of a node share the memory bus which can be also saturated and become a bottleneck.
1106 Moreover, the energy consumptions of the NAS benchmarks are lower over the
1107 one core scenario than over the multi-core scenario because
1108 the first scenario had less execution time than the latter which results in less static energy being consumed.
1109 The computations to communications ratios of the NAS benchmarks are higher over
1110 the one site one core scenario when compared to the ratio of the multi-core scenario.
1111 More energy reduction can be gained when this ratio is big because it pushes the proposed scaling algorithm to select smaller frequencies that decrease the dynamic power consumption. These experiments also showed that the energy
1112 consumption and the execution times of the EP and MG benchmarks do not change significantly over these two
1113 scenarios because there are no or small communications. Contrary to EP and MG, the energy consumptions and the execution times of the rest of the benchmarks vary according to the communication times that are different from one scenario to the other.
1116 \subfloat[The energy saving of running NAS benchmarks over one core and multicore scenarios]{%
1117 \includegraphics[width=.48\textwidth]{fig/eng_s_mc.eps}\label{fig:eng-s-mc}} \hspace{0.4cm}%
1118 \subfloat[The performance degradation of running NAS benchmarks over one core and multi-core scenarios
1120 \includegraphics[width=.48\textwidth]{fig/per_d_mc.eps}\label{fig:per-d-mc}}\hspace{0.4cm}%
1121 \subfloat[The trade-off distance of running NAS benchmarks over one core and multicore scenarios]{%
1122 \includegraphics[width=.48\textwidth]{fig/dist_mc.eps}\label{fig:dist-mc}}
1123 \label{fig:exp-res2}
1124 \caption{The experimental results of one core and multi-core scenarios}
1127 The energy saving percentages of all the NAS benchmarks running over these two scenarios are presented in Figure~\ref{fig:eng-s-mc}.
1128 The figure shows that the energy saving percentages in the one
1129 core and the multi-core scenarios
1130 are approximately equivalent, on average they are equal to 25.9\% and 25.1\% respectively.
1131 The energy consumption is reduced at the same rate in the two scenarios when compared to the energy consumption of the executions without DVFS.
1134 The performance degradation percentages of the NAS benchmarks are presented in
1135 Figure~\ref{fig:per-d-mc}. It shows that the performance degradation percentages are higher for the NAS benchmarks executed over the one core per node scenario (on average equal to 10.6\%) than over the multi-core scenario (on average equal to 7.5\%). The performance degradation percentages over the multi-core scenario are lower because the computations to communications ratios are smaller than the ratios of the other scenario.
1137 The trade-off distances percentages of the NAS benchmarks over both scenarios are presented
1138 in ~Figure~\ref{fig:dist-mc}. These trade-off distances between energy consumption reduction and performance are used to verify which scenario is the best in both terms at the same time. The figure shows that the trade-off distance percentages are on average bigger over the multi-core scenario (17.6\%) than over the one core per node scenario (15.3\%).
1146 \subsection{Experiments with different static power scenarios}
1149 In Section~\ref{sec.grid5000}, since it was not possible to measure the static power consumed by a CPU, the static power was assumed to be equal to 20\% of the measured dynamic power. This power is consumed during the whole execution time, during computation and communication times. Therefore, when the DVFS operations are applied by the scaling algorithm and the CPUs' frequencies lowered, the execution time might increase and consequently the consumed static energy will be increased too.
1151 The aim of this section is to evaluate the scaling algorithm while assuming different values of static powers.
1152 In addition to the previously used percentage of static power, two new static power ratios, 10\% and 30\% of the measured dynamic power of the core, are used in this section.
1153 The experiments have been executed with these two new static power scenarios over the one site one core per node scenario.
1154 In these experiments, the class D of the NAS parallel benchmarks were executed over the Nancy site. 16 computing nodes from the three clusters, Graphite, Graphene and Griffon, were used in this experiment.
1159 \subfloat[The energy saving percentages for the nodes executing the NAS benchmarks over the three power scenarios]{%
1160 \includegraphics[width=.48\textwidth]{fig/eng_pow.eps}\label{fig:eng-pow}} \hspace{0.4cm}%
1161 \subfloat[The performance degradation percentages for the NAS benchmarks over the three power scenarios]{%
1162 \includegraphics[width=.48\textwidth]{fig/per_pow.eps}\label{fig:per-pow}}\hspace{0.4cm}%
1163 \subfloat[The trade-off distance between the energy reduction and the performance of the NAS benchmarks over the three power scenarios]{%
1165 \includegraphics[width=.48\textwidth]{fig/dist_pow.eps}\label{fig:dist-pow}}
1167 \caption{The experimental results of different static power scenarios}
1174 \includegraphics[scale=0.5]{fig/three_scenarios.pdf}
1175 \caption{Comparing the selected frequency scaling factors for the MG benchmark over the three static power scenarios}
1179 The energy saving percentages of the NAS benchmarks with the three static power scenarios are presented
1180 in Figure~\ref{fig:eng-pow}. This figure shows that the 10\% of static power scenario
1181 gives the biggest energy saving percentages in comparison to the 20\% and 30\% static power
1182 scenarios. The small value of the static power consumption makes the proposed
1183 scaling algorithm select smaller frequencies for the CPUs.
1184 These smaller frequencies reduce the dynamic energy consumption more than increasing the consumed static energy which gives less overall energy consumption.
1185 The energy saving percentages of the 30\% static power scenario is the smallest between the other scenarios, because the scaling algorithm selects bigger frequencies for the CPUs which increases the energy consumption. Figure \ref{fig:fre-pow} demonstrates that the proposed scaling algorithm selects the best frequency scaling factors according to the static power consumption ratio being used.
1187 The performance degradation percentages are presented in Figure~\ref{fig:per-pow}.
1188 The 30\% static power scenario had less performance degradation percentage because the scaling algorithm
1189 had selected big frequencies for the CPUs. While,
1190 the inverse happens in the 10\% and 20\% scenarios because the scaling algorithm had selected CPUs' frequencies smaller than those of the 30\% scenario. The trade-off distance percentage for the NAS benchmarks with these three static power scenarios
1191 are presented in Figure~\ref{fig:dist-pow}.
1192 It shows that the best trade-off
1193 distance percentage is obtained with the 10\% static power scenario and this percentage
1194 is decreased for the other two scenarios because the scaling algorithm had selected different frequencies according to the static power values.
1196 In the EP benchmark, the energy saving, performance degradation and trade-off
1197 distance percentages for these static power scenarios are not significantly different because there is no communication in this benchmark. Therefore, the static power is only consumed during computation and the proposed scaling algorithm selects similar frequencies for the three scenarios. On the other hand, for the rest of the benchmarks, the scaling algorithm selects the values of the frequencies according to the communication times of each benchmark because the static energy consumption increases proportionally to the communication times.
1201 \subsection{Comparison of the proposed frequencies selecting algorithm }
1202 \label{sec.compare_EDP}
1204 Finding the frequencies that give the best trade-off between the energy consumption and the performance for a parallel
1205 application is not a trivial task. Many algorithms have been proposed to tackle this problem.
1206 In this section, the proposed frequencies selecting algorithm is compared to a method that uses the well known energy and delay product objective function, $EDP=energy \times delay$, that has been used by many researchers \cite{EDP_for_multi_processors,Energy_aware_application_scheduling,Exploring_Energy_Performance_TradeOffs}.
1207 This objective function was also used by Spiliopoulos et al. algorithm \cite{Spiliopoulos_Green.governors.Adaptive.DVFS} where they select the frequencies that minimize the EDP product and apply them with DVFS operations to the multi-core
1208 architecture. Their online algorithm predicts the energy consumption and execution time of a processor before using the EDP method.
1211 \subfloat[The energy reduction induced by the Maxdist method and the EDP method]{%
1212 \includegraphics[width=.48\textwidth]{fig/edp_eng}\label{fig:edp-eng}} \hspace{0.4cm}%
1213 \subfloat[The performance degradation induced by the Maxdist method and the EDP method]{%
1214 \includegraphics[width=.48\textwidth]{fig/edp_per}\label{fig:edp-perf}}\hspace{0.4cm}%
1215 \subfloat[The trade-off distance between the energy consumption reduction and the performance for the Maxdist method and the EDP method]{%
1216 \includegraphics[width=.48\textwidth]{fig/edp_dist}\label{fig:edp-dist}}
1217 \label{fig:edp-comparison}
1218 \caption{The comparison results}
1220 To fairly compare the proposed frequencies scaling algorithm to Spiliopoulos et al. algorithm, called Maxdist and EDP respectively, both algorithms use the same energy model, Equation~\ref{eq:energy} and
1221 execution time model, Equation~\ref{eq:perf}, to predict the energy consumption and the execution time for each computing node.
1222 Moreover, both algorithms start the search space from the upper bound computed as in Equation~\ref{eq:Fint}.
1223 Finally, the resulting EDP algorithm is an exhaustive search algorithm that tests all the possible frequencies, starting from the initial frequencies (upper bound),
1224 and selects the vector of frequencies that minimize the EDP product.
1226 Both algorithms were applied to the class D of the NAS benchmarks running over 16 nodes.
1227 The participating computing nodes are distributed according to the two scenarios described in Section~\ref{sec.res}.
1228 The experimental results, the energy saving, performance degradation and trade-off distance percentages, are
1229 presented in Figures~\ref{fig:edp-eng}, \ref{fig:edp-perf} and \ref{fig:edp-dist} respectively.
1231 As shown in these figures, the proposed frequencies selection algorithm, Maxdist, outperforms the EDP algorithm in terms of energy consumption reduction and performance for all of the benchmarks executed over the two scenarios.
1232 The proposed algorithm gives better results than the EDP method because it
1233 maximizes the energy saving and the performance at the same time.
1234 Moreover, the proposed scaling algorithm gives the same weight for these two metrics.
1235 Whereas, the EDP algorithm gives sometimes negative trade-off values for some benchmarks in the two sites scenarios.
1236 These negative trade-off values mean that the performance degradation percentage is higher than the energy saving percentage.
1237 The high positive values of the trade-off distance percentage mean that the energy saving percentage is much higher than the performance degradation percentage.
1238 The complexity of both algorithms, Maxdist and EDP, are of order $O(N \cdot M_i \cdot F_j)$ and
1239 $O(N \cdot M_i \cdot F_j^2)$ respectively, where $N$ is the number of the clusters, $M_i$ is the number of nodes and $F_j$ is the
1240 maximum number of available frequencies. When Maxdist is applied to a benchmark that is being executed over 32 nodes distributed between Nancy and Lyon sites, it takes on average $0.01$ $ms$ to compute the best frequencies while the EDP method is on average ten times slower over the same architecture.
1243 \section{Conclusion}
1245 This paper presents a new online frequencies selection algorithm.
1246 The algorithm selects the best vector of
1247 frequencies that maximizes the trade-off distance
1248 between the predicted energy consumption and the predicted execution time of the distributed
1249 applications \textcolor{blue}{with iterations} running over a heterogeneous grid. A new energy model
1250 is used by the proposed algorithm to predict the energy consumption
1251 of the distributed message passing application \textcolor{blue}{with iterations} running over a grid architecture.
1252 To evaluate the proposed method on a real heterogeneous grid platform, it was applied on the
1253 NAS parallel benchmarks and the class D instance was executed over the Grid'5000 testbed platform.
1254 The experiments executed on 16 nodes, distributed over three clusters, showed that the algorithm on average reduces by 30\% the energy consumption
1255 for all the NAS benchmarks while on average only degrading by 3.2\% the performance.
1256 The Maxdist algorithm was also evaluated in different scenarios that vary in the distribution of the computing nodes between different clusters' sites or use multi-core per node architecture or consume different static power values. The algorithm selects different vectors of frequencies according to the
1257 computations and communication times ratios, and the values of the static and measured dynamic powers of the CPUs.
1258 Finally, the proposed algorithm was compared to another method that uses
1259 the well known energy and delay product as an objective function. The comparison results showed
1260 that the proposed algorithm outperforms the latter by selecting a vector of frequencies that gives a better trade-off between energy consumption reduction and performance.
1262 In the near future, \textcolor{blue}{we will adapt the proposed algorithm to take the variability between some iterations in two steps. In the first step, the algorithm selects the best frequencies at the end of the first iterations and apply them to the system. In the second step, after some iterations (e.g. 5 iterations) the algorithm recomputes the frequencies depending on the average of the communication and computation times for all previous iterations. It will change the frequency of each node if the new frequency is different from the old one. Otherwise, it keeps the old frequency.}
1263 Also, we would like to develop a similar method that is adapted to
1264 asynchronous applications \textcolor{blue}{with iterations} where iterations are not synchronized and communications are overlapped with computations.
1265 The development of such a method might require a new energy model because the
1266 number of iterations is not known in advance and depends on
1267 the global convergence of the iterative system.
1271 \section*{Acknowledgment}
1273 This work has been partially supported by the Labex ACTION project (contract
1274 ``ANR-11-LABX-01-01''). Computations have been performed on the Grid'5000 platform. As a PhD student,
1275 Mr. Ahmed Fanfakh, would like to thank the University of Babylon (Iraq) for
1276 supporting his work.
1278 %\section*{References}
1279 \bibliography{my_reference}
1283 %%% Local Variables:
1287 %%% ispell-local-dictionary: "american"
1290 % LocalWords: DVFS Fanfakh Charr Franche Comté IUT Maréchal Juin cedex NAS et
1291 % LocalWords: supercomputing Tianhe Shoubu ExaScaler RIKEN GFlops CPUs GPUs
1292 % LocalWords: Luley Xeon NVIDIA GPU Rong Naveen Lizhe al AMD ij hj RENATER
1293 % LocalWords: Infiniband Graphene consumptions versa multi Spiliopoulos Labex
1294 % LocalWords: Maxdist ANR LABX