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27 \title{Best effort strategy and virtual load
28 for asynchronous iterative load balancing}
30 \author{Raphaël Couturier \and
34 \institute{R. Couturier \and A. Giersch \at
35 FEMTO-ST, University of Franche-Comté, Belfort, France \\
36 % Tel.: +123-45-678910\\
37 % Fax: +123-45-678910\\
39 raphael.couturier@femto-st.fr,
40 arnaud.giersch@femto-st.fr}
48 Most of the time, asynchronous load balancing algorithms have extensively been
49 studied in a theoretical point of view. The Bertsekas and Tsitsiklis'
50 algorithm~\cite[section~7.4]{bertsekas+tsitsiklis.1997.parallel}
51 is certainly the most well known algorithm for which the convergence proof is
52 given. From a practical point of view, when a node wants to balance a part of
53 its load to some of its neighbors, the strategy is not described. In this
54 paper, we propose a strategy called \emph{best effort} which tries to balance
55 the load of a node to all its less loaded neighbors while ensuring that all the
56 nodes concerned by the load balancing phase have the same amount of load.
57 Moreover, asynchronous iterative algorithms in which an asynchronous load
58 balancing algorithm is implemented most of the time can dissociate messages
59 concerning load transfers and message concerning load information. In order to
60 increase the converge of a load balancing algorithm, we propose a simple
61 heuristic called \emph{virtual load} which allows a node that receives a load
62 information message to integrate the load that it will receive later in its
63 load (virtually) and consequently sends a (real) part of its load to some of its
64 neighbors. In order to validate our approaches, we have defined a simulator
65 based on SimGrid which allowed us to conduct many experiments.
70 \section{Introduction}
72 Load balancing algorithms are extensively used in parallel and distributed
73 applications in order to reduce the execution times. They can be applied in
74 different scientific fields from high performance computation to micro sensor
75 networks. They are iterative by nature. In literature many kinds of load
76 balancing algorithms have been studied. They can be classified according
77 different criteria: centralized or decentralized, in static or dynamic
78 environment, with homogeneous or heterogeneous load, using synchronous or
79 asynchronous iterations, with a static topology or a dynamic one which evolves
80 during time. In this work, we focus on asynchronous load balancing algorithms
81 where computer nodes are considered homogeneous and with homogeneous load with
82 no external load. In this context, Bertsekas and Tsitsiklis have proposed an
83 algorithm which is definitively a reference for many works. In their work, they
84 proved that under classical hypotheses of asynchronous iterative algorithms and
85 a special constraint avoiding \emph{ping-pong} effect, an asynchronous
86 iterative algorithm converge to the uniform load distribution. This work has
87 been extended by many authors. For example, Cortés et al., with
88 DASUD~\cite{cortes+ripoll+cedo+al.2002.asynchronous}, propose a
89 version working with integer load. This work was later generalized by
90 the same authors in \cite{cedo+cortes+ripoll+al.2007.convergence}.
91 \FIXME{Rajouter des choses ici. Lesquelles ?}
93 Although the Bertsekas and Tsitsiklis' algorithm describes the condition to
94 ensure the convergence, there is no indication or strategy to really implement
95 the load distribution. In other word, a node can send a part of its load to one
96 or many of its neighbors while all the convergence conditions are
97 followed. Consequently, we propose a new strategy called \emph{best effort}
98 that tries to balance the load of a node to all its less loaded neighbors while
99 ensuring that all the nodes concerned by the load balancing phase have the same
100 amount of load. Moreover, when real asynchronous applications are considered,
101 using asynchronous load balancing algorithms can reduce the execution
102 times. Most of the times, it is simpler to distinguish load information messages
103 from data migration messages. Former ones allows a node to inform its
104 neighbors of its current load. These messages are very small, they can be sent
105 quite often. For example, if an computing iteration takes a significant times
106 (ranging from seconds to minutes), it is possible to send a new load information
107 message at each neighbor at each iteration. Latter messages contains data that
108 migrates from one node to another one. Depending on the application, it may have
109 sense or not that nodes try to balance a part of their load at each computing
110 iteration. But the time to transfer a load message from a node to another one is
111 often much more longer that to time to transfer a load information message. So,
112 when a node receives the information that later it will receive a data message,
113 it can take this information into account and it can consider that its new load
114 is larger. Consequently, it can send a part of it real load to some of its
115 neighbors if required. We call this trick the \emph{virtual load} mechanism.
119 So, in this work, we propose a new strategy for improving the distribution of
120 the load and a simple but efficient trick that also improves the load
121 balancing. Moreover, we have conducted many simulations with SimGrid in order to
122 validate our improvements are really efficient. Our simulations consider that in
123 order to send a message, a latency delays the sending and according to the
124 network performance and the message size, the time of the reception of the
127 In the following of this paper, Section~\ref{BT algo} describes the Bertsekas
128 and Tsitsiklis' asynchronous load balancing algorithm. Moreover, we present a
129 possible problem in the convergence conditions. Section~\ref{Best-effort}
130 presents the best effort strategy which provides an efficient way to reduce the
131 execution times. This strategy will be compared with other ones, presented in
132 Section~\ref{Other}. In Section~\ref{Virtual load}, the virtual load mechanism
133 is proposed. Simulations allowed to show that both our approaches are valid
134 using a quite realistic model detailed in Section~\ref{Simulations}. Finally we
135 give a conclusion and some perspectives to this work.
139 \section{Bertsekas and Tsitsiklis' asynchronous load balancing algorithm}
142 In order prove the convergence of asynchronous iterative load balancing
143 Bertsekas and Tsitsiklis proposed a model
144 in~\cite{bertsekas+tsitsiklis.1997.parallel}. Here we recall some notations.
145 Consider that $N={1,...,n}$ processors are connected through a network.
146 Communication links are represented by a connected undirected graph $G=(N,V)$
147 where $V$ is the set of links connecting different processors. In this work, we
148 consider that processors are homogeneous for sake of simplicity. It is quite
149 easy to tackle the heterogeneous case~\cite{ElsMonPre02}. Load of processor $i$
150 at time $t$ is represented by $x_i(t)\geq 0$. Let $V(i)$ be the set of
151 neighbors of processor $i$. Each processor $i$ has an estimate of the load of
152 each of its neighbors $j \in V(i)$ represented by $x_j^i(t)$. According to
153 asynchronism and communication delays, this estimate may be outdated. We also
154 consider that the load is described by a continuous variable.
156 When a processor send a part of its load to one or some of its neighbors, the
157 transfer takes time to be completed. Let $s_{ij}(t)$ be the amount of load that
158 processor $i$ has transferred to processor $j$ at time $t$ and let $r_{ij}(t)$ be the
159 amount of load received by processor $j$ from processor $i$ at time $t$. Then
160 the amount of load of processor $i$ at time $t+1$ is given by:
162 x_i(t+1)=x_i(t)-\sum_{j\in V(i)} s_{ij}(t) + \sum_{j\in V(i)} r_{ji}(t)
167 Some conditions are required to ensure the convergence. One of them can be
168 called the \emph{ping-pong} condition which specifies that:
170 x_i(t)-\sum _{k\in V(i)} s_{ik}(t) \geq x_j^i(t)+s_{ij}(t)
172 for any processor $i$ and any $j \in V(i)$ such that $x_i(t)>x_j^i(t)$. This
173 condition aims at avoiding a processor to send a part of its load and being
174 less loaded after that.
176 Nevertheless, we think that this condition may lead to deadlocks in some
177 cases. For example, if we consider only three processors and that processor $1$
178 is linked to processor $2$ which is also linked to processor $3$ (i.e. a simple
179 chain which 3 processors). Now consider we have the following values at time $t$:
186 In this case, processor $2$ can either sends load to processor $1$ or processor
187 $3$. If it sends load to processor $1$ it will not satisfy condition
188 (\ref{eq:ping-pong}) because after the sending it will be less loaded that
189 $x_3^2(t)$. So we consider that the \emph{ping-pong} condition is probably to
190 strong. Currently, we did not try to make another convergence proof without this
191 condition or with a weaker condition.
193 Nevertheless, we conjecture that such a weaker condition exists. In fact, we
194 have never seen any scenario that is not leading to convergence, even with
195 load-balancing strategies that are not exactly fulfilling these two conditions.
197 It may be the subject of future work to express weaker conditions, and to prove
198 that they are sufficient to ensure the convergence of the load-balancing
201 \section{Best effort strategy}
204 In this section we describe a new load-balancing strategy that we call
205 \emph{best effort}. First, we explain the general idea behind this strategy,
206 and then we describe some variants of this basic strategy.
208 \subsection{Basic strategy}
210 The general idea behind the \emph{best effort} strategy is that each processor,
211 that detects it has more load than some of its neighbors, sends some load to the
212 most of its less loaded neighbors, doing its best to reach the equilibrium
213 between those neighbors and himself.
215 More precisely, when a processor $i$ is in its load-balancing phase,
216 he proceeds as following.
218 \item First, the neighbors are sorted in non-decreasing order of their
219 known loads $x^i_j(t)$.
221 \item Then, this sorted list is traversed in order to find its largest
222 prefix such as the load of each selected neighbor is lesser than:
224 \item the processor's own load, and
225 \item the mean of the loads of the selected neighbors and of the
228 Let's call $S_i(t)$ the set of the selected neighbors, and
229 $\bar{x}(t)$ the mean of the loads of the selected neighbors and of
232 \bar{x}(t) = \frac{1}{\abs{S_i(t)} + 1}
233 \left( x_i(t) + \sum_{j\in S_i(t)} x^i_j(t) \right)
235 The following properties hold:
238 S_i(t) \subset V(i) \\
239 x^i_j(t) < x_i(t) & \forall j \in S_i(t) \\
240 x^i_j(t) < \bar{x} & \forall j \in S_i(t) \\
241 x^i_j(t) \leq x^i_k(t) & \forall j \in S_i(t), \forall k \in V(i) \setminus S_i(t) \\
246 \item Once this selection is completed, processor $i$ sends to each of
247 the selected neighbor $j\in S_i(t)$ an amount of load $s_{ij}(t) =
250 From the above equations, and notably from the definition of
251 $\bar{x}$, it can easily be verified that:
254 x_i(t) - \sum_{j\in S_i(t)} s_{ij}(t) = \bar{x} \\
255 x^i_j(t) + s_{ij}(t) = \bar{x} & \forall j \in S_i(t)
260 \subsection{Leveling the amount to send}
262 With the aforementioned basic strategy, each node does its best to reach the
263 equilibrium with its neighbors. Since each node may be taking the same kind of
264 decision at the same moment, there is the risk that a node receives load from
265 several of its neighbors, and then is temporary going off the equilibrium state.
266 This is particularly true with strongly connected applications.
268 In order to reduce this effect, we add the ability to level the amount to send.
269 The idea, here, is to make smaller steps toward the equilibrium, such that a
270 potentially wrong decision has a lower impact.
272 Concretely, once $s_{ij}$ has been evaluated as before, it is simply divided by
273 some configurable factor. That's what we named the ``parameter $k$'' in
274 Section~\ref{Results}. The amount of data to send is then $s_{ij}(t) = (\bar{x}
276 \FIXME[check that it's still named $k$ in Sec.~\ref{Results}]{}
278 \section{Other strategies}
281 Another load balancing strategy, working under the same conditions, was
282 previously developed by Bahi, Giersch, and Makhoul in
283 \cite{bahi+giersch+makhoul.2008.scalable}. In order to assess the performances
284 of the new \emph{best effort}, we naturally chose to compare it to this anterior
285 work. More precisely, we will use the algorithm~2 from
286 \cite{bahi+giersch+makhoul.2008.scalable} and, in the following, we will
287 reference it under the name of Makhoul's.
289 Here is an outline of the Makhoul's algorithm. When a given node needs to take
290 a load balancing decision, it starts by sorting its neighbors by increasing
291 order of their load. Then, it computes the difference between its own load, and
292 the load of each of its neighbors. Finally, taking the neighbors following the
293 order defined before, the amount of load to send $s_{ij}$ is computed as
294 $1/(N+1)$ of the load difference, with $N$ being the number of neighbors. This
295 process continues as long as the node is more loaded than the considered
299 \section{Virtual load}
302 In this section, we present the concept of \texttt{virtual load}. In order to
303 use this concept, load balancing messages must be sent using two different kinds
304 of messages: load information messages and load balancing messages. More
305 precisely, a node wanting to send a part of its load to one of its neighbors,
306 can first send a load information message containing the load it will send and
307 then it can send the load balancing message containing data to be transferred.
308 Load information message are really short, consequently they will be received
309 very quickly. In opposition, load balancing messages are often bigger and thus
310 require more time to be transferred.
312 The concept of \texttt{virtual load} allows a node that received a load
313 information message to integrate the load that it will receive later in its load
314 (virtually) and consequently send a (real) part of its load to some of its
315 neighbors. In fact, a node that receives a load information message knows that
316 later it will receive the corresponding load balancing message containing the
317 corresponding data. So if this node detects it is too loaded compared to some
318 of its neighbors and if it has enough load (real load), then it can send more
319 load to some of its neighbors without waiting the reception of the load
322 Doing this, we can expect a faster convergence since nodes have a faster
323 information of the load they will receive, so they can take in into account.
325 \FIXME{Est ce qu'on donne l'algo avec virtual load?}
327 \FIXME{describe integer mode}
329 \section{Simulations}
332 In order to test and validate our approaches, we wrote a simulator
334 framework~\cite{casanova+legrand+quinson.2008.simgrid}. This
335 simulator, which consists of about 2,700 lines of C++, allows to run
336 the different load-balancing strategies under various parameters, such
337 as the initial distribution of load, the interconnection topology, the
338 characteristics of the running platform, etc. Then several metrics
339 are issued that permit to compare the strategies.
341 The simulation model is detailed in the next section (\ref{Sim
342 model}), and the experimental contexts are described in
343 section~\ref{Contexts}. Then the results of the simulations are
344 presented in section~\ref{Results}.
346 \subsection{Simulation model}
349 In the simulation model the processors exchange messages which are of
350 two kinds. First, there are \emph{control messages} which only carry
351 information that is exchanged between the processors, such as the
352 current load, or the virtual load transfers if this option is
353 selected. These messages are rather small, and their size is
354 constant. Then, there are \emph{data messages} that carry the real
355 load transferred between the processors. The size of a data message
356 is a function of the amount of load that it carries, and it can be
357 pretty large. In order to receive the messages, each processor has
358 two receiving channels, one for each kind of messages. Finally, when
359 a message is sent or received, this is done by using the non-blocking
360 primitives of SimGrid\footnote{That are \texttt{MSG\_task\_isend()},
361 and \texttt{MSG\_task\_irecv()}.}.
363 During the simulation, each processor concurrently runs three threads:
364 a \emph{receiving thread}, a \emph{computing thread}, and a
365 \emph{load-balancing thread}, which we will briefly describe now.
367 For the sake of simplicity, a few details were voluntary omitted from
368 these descriptions. For an exhaustive presentation, we refer to the
369 actual source code that was used for the experiments%
370 \footnote{As mentioned before, our simulator relies on the SimGrid
371 framework~\cite{casanova+legrand+quinson.2008.simgrid}. For the
372 experiments, we used a pre-release of SimGrid 3.7 (Git commit
373 67d62fca5bdee96f590c942b50021cdde5ce0c07, available from
374 \url{https://gforge.inria.fr/scm/?group_id=12})}, and which is
376 \url{http://info.iut-bm.univ-fcomte.fr/staff/giersch/software/loba.tar.gz}.
378 \subsubsection{Receiving thread}
380 The receiving thread is in charge of waiting for messages to come, either on the
381 control channel, or on the data channel. Its behavior is sketched by
382 Algorithm~\ref{algo.recv}. When a message is received, it is pushed in a buffer
383 of received message, to be later consumed by one of the other threads. There
384 are two such buffers, one for the control messages, and one for the data
385 messages. The buffers are implemented with a lock-free FIFO
386 \cite{sutter.2008.writing} to avoid contention between the threads.
389 \caption{Receiving thread}
393 \VAR{ctrl\_chan}, \VAR{data\_chan}
394 & communication channels (control and data) \\
395 \VAR{ctrl\_fifo}, \VAR{data\_fifo}
396 & buffers of received messages (control and data) \\
399 wait for a message to be available on either \VAR{ctrl\_chan},
400 or \VAR{data\_chan}\;
401 \If{a message is available on \VAR{ctrl\_chan}}{%
402 get the message from \VAR{ctrl\_chan}, and push it into \VAR{ctrl\_fifo}\;
404 \If{a message is available on \VAR{data\_chan}}{%
405 get the message from \VAR{data\_chan}, and push it into \VAR{data\_fifo}\;
410 \subsubsection{Computing thread}
412 The computing thread is in charge of the real load management. As exposed in
413 Algorithm~\ref{algo.comp}, it iteratively runs the following operations:
415 \item if some load was received from the neighbors, get it;
416 \item if there is some load to send to the neighbors, send it;
417 \item run some computation, whose duration is function of the current
418 load of the processor.
420 Practically, after the computation, the computing thread waits for a
421 small amount of time if the iterations are looping too fast (for
422 example, when the current load is near zero).
425 \caption{Computing thread}
429 \VAR{data\_fifo} & buffer of received data messages \\
430 \VAR{real\_load} & current load \\
433 \If{\VAR{data\_fifo} is empty and $\VAR{real\_load} = 0$}{%
434 wait until a message is pushed into \VAR{data\_fifo}\;
436 \While{\VAR{data\_fifo} is not empty}{%
437 pop a message from \VAR{data\_fifo}\;
438 get the load embedded in the message, and add it to \VAR{real\_load}\;
440 \ForEach{neighbor $n$}{%
441 \If{there is some amount of load $a$ to send to $n$}{%
442 send $a$ units of load to $n$, and subtract it from \VAR{real\_load}\;
445 \If{$\VAR{real\_load} > 0.0$}{
446 simulate some computation, whose duration is function of \VAR{real\_load}\;
447 ensure that the main loop does not iterate too fast\;
452 \subsubsection{Load-balancing thread}
454 The load-balancing thread is in charge of running the load-balancing algorithm,
455 and exchange the control messages. As shown in Algorithm~\ref{algo.lb}, it
456 iteratively runs the following operations:
458 \item get the control messages that were received from the neighbors;
459 \item run the load-balancing algorithm;
460 \item send control messages to the neighbors, to inform them of the
461 processor's current load, and possibly of virtual load transfers;
462 \item wait a minimum (configurable) amount of time, to avoid to
467 \caption{Load-balancing}
470 \While{\VAR{ctrl\_fifo} is not empty}{%
471 pop a message from \VAR{ctrl\_fifo}\;
472 identify the sender of the message,
473 and update the current knowledge of its load\;
475 run the load-balancing algorithm to make the decision about load transfers\;
476 \ForEach{neighbor $n$}{%
477 send a control messages to $n$\;
479 ensure that the main loop does not iterate too fast\;
483 \paragraph{}\FIXME{ajouter des détails sur la gestion de la charge virtuelle ?
484 par ex, donner l'idée générale de l'implémentation. l'idée générale est déja décrite en section~\ref{Virtual load}}
486 \subsection{Experimental contexts}
489 In order to assess the performances of our algorithms, we ran our
490 simulator with various parameters, and extracted several metrics, that
491 we will describe in this section.
493 \subsubsection{Load balancing strategies}
495 Several load balancing strategies were compared. We ran the experiments with
496 the \emph{Best effort}, and with the \emph{Makhoul} strategies. \emph{Best
497 effort} was tested with parameter $k = 1$, $k = 2$, and $k = 4$. Secondly,
498 each strategy was run in its two variants: with, and without the management of
499 \emph{virtual load}. Finally, we tested each configuration with \emph{real},
500 and with \emph{integer} load.
502 To summarize the different load balancing strategies, we have:
504 \item[\textbf{strategies:}] \emph{Makhoul}, or \emph{Best effort} with $k\in
506 \item[\textbf{variants:}] with, or without virtual load
507 \item[\textbf{domain:}] real load, or integer load
510 This gives us as many as $4\times 2\times 2 = 16$ different strategies.
512 \subsubsection{End of the simulation}
514 The simulations were run until the load was nearly balanced among the
515 participating nodes. More precisely the simulation stops when each node holds
516 an amount of load at less than 1\% of the load average, during an arbitrary
517 number of computing iterations (2000 in our case).
519 Note that this convergence detection was implemented in a centralized manner.
520 This is easy to do within the simulator, but it's obviously not realistic. In a
521 real application we would have chosen a decentralized convergence detection
522 algorithm, like the one described by Bahi, Contassot-Vivier, Couturier, and
523 Vernier in \cite{10.1109/TPDS.2005.2}.
525 \subsubsection{Platforms}
527 In order to show the behavior of the different strategies in different
528 settings, we simulated the executions on two sorts of platforms. These two
529 sorts of platforms differ by their underlaid network topology. On the one hand,
530 we have homogeneous platforms, modeled as a cluster. On the other hand, we have
531 heterogeneous platforms, modeled as the interconnection of a number of clusters.
533 The clusters were modeled by a fixed number of computing nodes interconnected
534 through a backbone link. Each computing node has a computing power of
535 1~GFlop/s, and is connected to the backbone by a network link whose bandwidth is
536 of 125~MB/s, with a latency of 50~$\mu$s. The backbone has a network bandwidth
537 of 2.25~GB/s, with a latency of 500~$\mu$s.
539 The heterogeneous platform descriptions were created by taking a subset of the
540 Grid'5000 infrastructure\footnote{Grid'5000 is a French large scale experimental
541 Grid (see \url{https://www.grid5000.fr/}).}, as described in the platform file
542 \texttt{g5k.xml} distributed with SimGrid. Note that the heterogeneity of the
543 platform here only comes from the network topology. Indeed, since our
544 algorithms currently do not handle heterogeneous computing resources, the
545 processor speeds were normalized, and we arbitrarily chose to fix them to
548 Then we derived each sort of platform with four different number of computing
549 nodes: 16, 64, 256, and 1024 nodes.
551 \subsubsection{Configurations}
553 The distributed processes of the application were then logically organized along
554 three possible topologies: a line, a torus or an hypercube. We ran tests where
555 the total load was initially on an only node (at one end for the line topology),
556 and other tests where the load was initially randomly distributed across all the
557 participating nodes. The total amount of load was fixed to a number of load
558 units equal to 1000 times the number of node. The average load is then of 1000
561 For each of the preceding configuration, we finally had to choose the
562 computation and communication costs of a load unit. We chose them, such as to
563 have three different computation over communication cost ratios, and hence model
564 three different kinds of applications:
566 \item mainly communicating, with a computation/communication cost ratio of $1/10$;
567 \item mainly computing, with a computation/communication cost ratio of $10/1$ ;
568 \item balanced, with a computation/communication cost ratio of $1/1$.
571 To summarize the various configurations, we have:
573 \item[\textbf{platforms:}] homogeneous (cluster), or heterogeneous (subset of
575 \item[\textbf{platform sizes:}] platforms with 16, 64, 256, or 1024 nodes
576 \item[\textbf{process topologies:}] line, torus, or hypercube
577 \item[\textbf{initial load distribution:}] initially on a only node, or
578 initially randomly distributed over all nodes
579 \item[\textbf{computation/communication ratio:}] $10/1$, $1/1$, or $1/10$
582 This gives us as many as $2\times 4\times 3\times 2\times 3 = 144$ different
585 Combined with the various load balancing strategies, we had $16\times 144 =
586 2304$ distinct settings to evaluate. In fact, as it will be shown later, we
587 didn't run all the strategies, nor all the configurations for the bigger
588 platforms with 1024 nodes, since to simulations would have run for a too long
591 Anyway, all these the experiments represent more than 240 hours of computing
594 \subsubsection{Metrics}
596 In order to evaluate and compare the different load balancing strategies we had
597 to define several metrics. Our goal, when choosing these metrics, was to have
598 something tending to a constant value, i.e. to have a measure which is not
599 changing anymore once the convergence state is reached. Moreover, we wanted to
600 have some normalized value, in order to be able to compare them across different
603 With these constraints in mind, we defined the following metrics:
606 \item[\textbf{average idle time:}] that's the total time spent, when the nodes
607 don't hold any share of load, and thus have nothing to compute. This total
608 time is divided by the number of participating nodes, such as to have a number
609 that can be compared between simulations of different sizes.
611 This metric is expected to give an idea of the ability of the strategy to
612 diffuse the load quickly. A smaller value is better.
614 \item[\textbf{average convergence date:}] that's the average of the dates when
615 all nodes reached the convergence state. The dates are measured as a number
616 of (simulated) seconds since the beginning of the simulation.
618 \item[\textbf{maximum convergence date:}] that's the date when the last node
619 reached the convergence state.
621 These two dates give an idea of the time needed by the strategy to reach the
622 equilibrium state. A smaller value is better.
624 \item[\textbf{data transfer amount:}] that's the sum of the amount of all data
625 transfers during the simulation. This sum is then normalized by dividing it
626 by the total amount of data present in the system.
628 This metric is expected to give an idea of the efficiency of the strategy in
629 terms of data movements, i.e. its ability to reach the equilibrium with fewer
630 transfers. Again, a smaller value is better.
635 \subsection{Validation of our approaches}
640 \includegraphics[width=.5\linewidth]{data/graphs/R1-10:1-cluster-line}
641 \includegraphics[width=.5\linewidth]{data/graphs/R1-10:1-cluster-torus}%
643 \includegraphics[width=.5\linewidth]{data/graphs/R1-10:1-cluster-hcube}
644 \caption{Results \textbf{[FIXME]}}
650 - comparer be/makhoul -> be tient la route
651 -> en réel uniquement
652 - valider l'extension virtual load -> c'est 'achement bien
653 - proposer le -k -> ça peut aider dans certains cas
654 - conclure avec la version entière -> on n'a pas l'effet d'escalier !
655 Q: comment inclure les types/tailles de platesformes ?
656 Q: comment faire des moyennes ?
657 Q: comment introduire les distrib 1/N ?
660 On constate quoi (vérifier avec les chiffres)?
662 \item cluster ou grid, entier ou réel, ne font pas de grosses différences
664 \item bookkeeping? améliore souvent les choses, parfois au prix d'un retard au démarrage
666 \item makhoul? se fait battre sur les grosses plateformes
668 \item taille de plateforme?
670 \item ratio comp/comm?
672 \item option $k$? peut-être intéressant sur des plateformes fortement interconnectées (hypercube)
674 \item volume de comm? souvent, besteffort/plain en fait plus. pourquoi?
676 \item répartition initiale de la charge ?
678 \item integer mode sur topo. line n'a jamais fini en plain? vérifier si ce n'est
679 pas à cause de l'effet d'escalier que bk est capable de gommer.
684 On veut montrer quoi ? :
685 \FIXME{remove that part}
687 1) best plus rapide que les autres (simple, makhoul)
688 2) avantage virtual load
690 Est ce qu'on peut trouver des contre exemple?
694 Simulation avec temps définies assez long et on mesure la qualité avec : volume de calcul effectué, volume de données échangées
695 Mais aussi simulation avec temps court qui montre que seul best converge
697 Expés avec ratio calcul/comm rapide et lent
699 Quelques expés avec charge initiale aléatoire plutot que sur le premier proc
701 Cadre processeurs homogènes
705 On ne tient pas compte de la vitesse des liens donc on la considère homogène
707 Prendre un réseau hétérogène et rendre processeur homogène
709 Taille : 10 100 très gros
712 \section{Conclusion and perspectives}
716 \begin{acknowledgements}
717 Computations have been performed on the supercomputer facilities of
718 the Mésocentre de calcul de Franche-Comté.
719 \end{acknowledgements}
721 \FIXME{find and add more references}
722 \bibliographystyle{spmpsci}
723 \bibliography{biblio}
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