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7 \chapter{Perimeter-based Coverage Optimization to Improve Lifetime in Wireless Sensor Networks}
14 The most important problem in a Wireless Sensor Network (WSN) is to optimize the
15 use of its limited energy provision, so that it can fulfill its monitoring task
16 as long as possible. Among known available approaches that can be used to
17 improve power management, lifetime coverage optimization provides activity
18 scheduling which ensures sensing coverage while minimizing the energy cost. In
19 this paper, we propose such an approach called Perimeter-based Coverage Optimization
20 protocol (PeCO). It is a hybrid of centralized and distributed methods: the
21 region of interest is first subdivided into subregions and our protocol is then
22 distributed among sensor nodes in each subregion.
23 The novelty of our approach lies essentially in the formulation of a new
24 mathematical optimization model based on the perimeter coverage level to schedule
25 sensors' activities. Extensive simulation experiments have been performed using
26 OMNeT++, the discrete event simulator, to demonstrate that PeCO can
27 offer longer lifetime coverage for WSNs in comparison with some other protocols.
29 \section{THE PeCO PROTOCOL DESCRIPTION}
32 \noindent In this section, we describe in details our Lifetime Coverage
33 Optimization protocol. First we present the assumptions we made and the models
34 we considered (in particular the perimeter coverage one), second we describe the
35 background idea of our protocol, and third we give the outline of the algorithm
36 executed by each node.
40 \subsection{Assumptions and Models}
42 PeCO protocol uses the same assumptions and network model that presented in chapter 3, section \ref{ch3:sec:02:01}.
44 The PeCO protocol uses the same perimeter-coverage model as Huang and
45 Tseng in~\cite{ref133}. It can be expressed as follows: a sensor is
46 said to be perimeter covered if all the points on its perimeter are covered by
47 at least one sensor other than itself. They proved that a network area is
48 $k$-covered if and only if each sensor in the network is $k$-perimeter-covered (perimeter covered by at least $k$ sensors).
50 Figure~\ref{pcm2sensors}(a) shows the coverage of sensor node~$0$. On this
51 figure, we can see that sensor~$0$ has nine neighbors and we have reported on
52 its perimeter (the perimeter of the disk covered by the sensor) for each
53 neighbor the two points resulting from intersection of the two sensing
54 areas. These points are denoted for neighbor~$i$ by $iL$ and $iR$, respectively
55 for left and right from neighbor point of view. The resulting couples of
56 intersection points subdivide the perimeter of sensor~$0$ into portions called
61 \begin{tabular}{@{}cr@{}}
62 \includegraphics[width=95mm]{Figures/ch5/pcm.jpg} & \raisebox{3.25cm}{(a)} \\
63 \includegraphics[width=95mm]{Figures/ch5/twosensors.jpg} & \raisebox{2.75cm}{(b)}
65 \caption{(a) Perimeter coverage of sensor node 0 and (b) finding the arc of
66 $u$'s perimeter covered by $v$.}
70 Figure~\ref{pcm2sensors}(b) describes the geometric information used to find the
71 locations of the left and right points of an arc on the perimeter of a sensor
72 node~$u$ covered by a sensor node~$v$. Node~$v$ is supposed to be located on the
73 west side of sensor~$u$, with the following respective coordinates in the
74 sensing area~: $(v_x,v_y)$ and $(u_x,u_y)$. From the previous coordinates we can
75 compute the euclidean distance between nodes~$u$ and $v$: $Dist(u,v)=\sqrt{\vert
76 u_x - v_x \vert^2 + \vert u_y-v_y \vert^2}$, while the angle~$\alpha$ is
77 obtained through the formula: $$\alpha = \arccos \left(\dfrac{Dist(u,v)}{2R_s}
78 \right).$$ The arc on the perimeter of~$u$ defined by the angular interval $[\pi
79 - \alpha,\pi + \alpha]$ is said to be perimeter-covered by sensor~$v$.
81 Every couple of intersection points is placed on the angular interval $[0,2\pi]$
82 in a counterclockwise manner, leading to a partitioning of the interval.
83 Figure~\ref{pcm2sensors}(a) illustrates the arcs for the nine neighbors of
84 sensor $0$ and Figure~\ref{expcm} gives the position of the corresponding arcs
85 in the interval $[0,2\pi]$. More precisely, we can see that the points are
86 ordered according to the measures of the angles defined by their respective
87 positions. The intersection points are then visited one after another, starting
88 from the first intersection point after point~zero, and the maximum level of
89 coverage is determined for each interval defined by two successive points. The
90 maximum level of coverage is equal to the number of overlapping arcs. For
92 between~$5L$ and~$6L$ the maximum level of coverage is equal to $3$
93 (the value is highlighted in yellow at the bottom of Figure~\ref{expcm}), which
94 means that at most 2~neighbors can cover the perimeter in addition to node $0$.
95 Table~\ref{my-label} summarizes for each coverage interval the maximum level of
96 coverage and the sensor nodes covering the perimeter. The example discussed
97 above is thus given by the sixth line of the table.
102 \includegraphics[width=150.5mm]{Figures/ch5/expcm2.jpg}
103 \caption{Maximum coverage levels for perimeter of sensor node $0$.}
109 \caption{Coverage intervals and contributing sensors for sensor node 0.}
111 \begin{tabular}{|c|c|c|c|c|c|c|c|c|}
113 \begin{tabular}[c]{@{}c@{}}Left \\ point \\ angle~$\alpha$ \end{tabular} & \begin{tabular}[c]{@{}c@{}}Interval \\ left \\ point\end{tabular} & \begin{tabular}[c]{@{}c@{}}Interval \\ right \\ point\end{tabular} & \begin{tabular}[c]{@{}c@{}}Maximum \\ coverage\\ level\end{tabular} & \multicolumn{5}{c|}{\begin{tabular}[c]{@{}c@{}}Set of sensors\\ involved \\ in coverage interval\end{tabular}} \\ \hline
114 0.0291 & 1L & 2L & 4 & 0 & 1 & 3 & 4 & \\ \hline
115 0.104 & 2L & 3R & 5 & 0 & 1 & 3 & 4 & 2 \\ \hline
116 0.3168 & 3R & 4R & 4 & 0 & 1 & 4 & 2 & \\ \hline
117 0.6752 & 4R & 1R & 3 & 0 & 1 & 2 & & \\ \hline
118 1.8127 & 1R & 5L & 2 & 0 & 2 & & & \\ \hline
119 1.9228 & 5L & 6L & 3 & 0 & 2 & 5 & & \\ \hline
120 2.3959 & 6L & 2R & 4 & 0 & 2 & 5 & 6 & \\ \hline
121 2.4258 & 2R & 7L & 3 & 0 & 5 & 6 & & \\ \hline
122 2.7868 & 7L & 8L & 4 & 0 & 5 & 6 & 7 & \\ \hline
123 2.8358 & 8L & 5R & 5 & 0 & 5 & 6 & 7 & 8 \\ \hline
124 2.9184 & 5R & 7R & 4 & 0 & 6 & 7 & 8 & \\ \hline
125 3.3301 & 7R & 9R & 3 & 0 & 6 & 8 & & \\ \hline
126 3.9464 & 9R & 6R & 4 & 0 & 6 & 8 & 9 & \\ \hline
127 4.767 & 6R & 3L & 3 & 0 & 8 & 9 & & \\ \hline
128 4.8425 & 3L & 8R & 4 & 0 & 3 & 8 & 9 & \\ \hline
129 4.9072 & 8R & 4L & 3 & 0 & 3 & 9 & & \\ \hline
130 5.3804 & 4L & 9R & 4 & 0 & 3 & 4 & 9 & \\ \hline
131 5.9157 & 9R & 1L & 3 & 0 & 3 & 4 & & \\ \hline
138 In the PeCO protocol, the scheduling of the sensor nodes' activities is formulated with an
139 integer program based on coverage intervals. The formulation of the coverage
140 optimization problem is detailed in~section~\ref{ch5:sec:03}. Note that when a sensor
141 node has a part of its sensing range outside the WSN sensing field, as in
142 Figure~\ref{ex4pcm}, the maximum coverage level for this arc is set to $\infty$
143 and the corresponding interval will not be taken into account by the
144 optimization algorithm.
149 \includegraphics[width=95.5mm]{Figures/ch5/ex4pcm.jpg}
150 \caption{Sensing range outside the WSN's area of interest.}
158 \subsection{The Main Idea}
159 \label{ch5:sec:02:02}
161 \noindent The WSN area of interest is, in a first step, divided into regular
162 homogeneous subregions using a divide-and-conquer algorithm. In a second step
163 our protocol will be executed in a distributed way in each subregion
164 simultaneously to schedule nodes' activities for one sensing period.
166 As shown in Figure~\ref{fig2}, node activity scheduling is produced by our
167 protocol in a periodic manner. Each period is divided into 4 stages: Information
168 (INFO) Exchange, Leader Election, Decision (the result of an optimization
169 problem), and Sensing. For each period there is exactly one set cover
170 responsible for the sensing task. Protocols based on a periodic scheme, like
171 PeCO, are more robust against an unexpected node failure. On the one hand, if
172 a node failure is discovered before taking the decision, the corresponding sensor
173 node will not be considered by the optimization algorithm. On the other
174 hand, if the sensor failure happens after the decision, the sensing task of the
175 network will be temporarily affected: only during the period of sensing until a
176 new period starts, since a new set cover will take charge of the sensing task in
177 the next period. The energy consumption and some other constraints can easily be
178 taken into account since the sensors can update and then exchange their
179 information (including their residual energy) at the beginning of each period.
180 However, the pre-sensing phases (INFO Exchange, Leader Election, and Decision)
181 are energy consuming, even for nodes that will not join the set cover to monitor
186 \includegraphics[width=95.5mm]{Figures/ch5/Model.pdf}
187 \caption{PeCO protocol.}
194 \subsection{PeCO Protocol Algorithm}
195 \label{ch5:sec:02:03}
198 \noindent The pseudocode implementing the protocol on a node is given below.
199 More precisely, Algorithm~\ref{alg:PeCO} gives a brief description of the
200 protocol applied by a sensor node $s_k$ where $k$ is the node index in the WSN.
202 \begin{algorithm}[h!]
203 % \KwIn{all the parameters related to information exchange}
204 % \KwOut{$winer-node$ (: the id of the winner sensor node, which is the leader of current round)}
206 %\emph{Initialize the sensor node and determine it's position and subregion} \;
208 \If{ $RE_k \geq E_{th}$ }{
209 \emph{$s_k.status$ = COMMUNICATION}\;
210 \emph{Send $INFO()$ packet to other nodes in subregion}\;
211 \emph{Wait $INFO()$ packet from other nodes in subregion}\;
212 \emph{Update K.CurrentSize}\;
213 \emph{LeaderID = Leader election}\;
214 \If{$ s_k.ID = LeaderID $}{
215 \emph{$s_k.status$ = COMPUTATION}\;
217 \If{$ s_k.ID $ is Not previously selected as a Leader }{
218 \emph{ Execute the perimeter coverage model}\;
219 % \emph{ Determine the segment points using perimeter coverage model}\;
222 \If{$ (s_k.ID $ is the same Previous Leader) And (K.CurrentSize = K.PreviousSize)}{
224 \emph{ Use the same previous cover set for current sensing stage}\;
227 \emph{Update $a^j_{ik}$; prepare data for IP~Algorithm}\;
228 \emph{$\left\{\left(X_{1},\dots,X_{l},\dots,X_{K}\right)\right\}$ = Execute Integer Program Algorithm($K$)}\;
229 \emph{K.PreviousSize = K.CurrentSize}\;
232 \emph{$s_k.status$ = COMMUNICATION}\;
233 \emph{Send $ActiveSleep()$ to each node $l$ in subregion}\;
234 \emph{Update $RE_k $}\;
237 \emph{$s_k.status$ = LISTENING}\;
238 \emph{Wait $ActiveSleep()$ packet from the Leader}\;
239 \emph{Update $RE_k $}\;
242 \Else { Exclude $s_k$ from entering in the current sensing stage}
243 \caption{PeCO($s_k$)}
247 In this algorithm, K.CurrentSize and K.PreviousSize respectively represent the
248 current number and the previous number of living nodes in the subnetwork of the
249 subregion. Initially, the sensor node checks its remaining energy $RE_k$, which
250 must be greater than a threshold $E_{th}$ in order to participate in the current
251 period. Each sensor node determines its position and its subregion using an
252 embedded GPS or a location discovery algorithm. After that, all the sensors
253 collect position coordinates, remaining energy, sensor node ID, and the number
254 of their one-hop live neighbors during the information exchange. The sensors
255 inside a same region cooperate to elect a leader. The selection criteria for the
256 leader, in order of priority, are: larger numbers of neighbors, larger remaining
257 energy, and then in case of equality, larger index. Once chosen, the leader
258 collects information to formulate and solve the integer program which allows to
259 construct the set of active sensors in the sensing stage.
263 \section{Perimeter-based Coverage Problem Formulation}
267 \noindent In this section, the coverage model is mathematically formulated. We
268 start with a description of the notations that will be used throughout the
271 First, we have the following sets:
273 \item $S$ represents the set of WSN sensor nodes;
274 \item $A \subseteq S $ is the subset of alive sensors;
275 \item $I_j$ designates the set of coverage intervals (CI) obtained for
278 $I_j$ refers to the set of coverage intervals which have been defined according
279 to the method introduced in subsection~\ref{ch5:sec:02:01}. For a coverage interval $i$,
280 let $a^j_{ik}$ denotes the indicator function of whether sensor~$k$ is involved
281 in coverage interval~$i$ of sensor~$j$, that is:
285 1 & \mbox{if sensor $k$ is involved in the } \\
286 & \mbox{coverage interval $i$ of sensor $j$}, \\
287 0 & \mbox{otherwise.}\\
292 Note that $a^k_{ik}=1$ by definition of the interval.
294 Second, we define several binary and integer variables. Hence, each binary
295 variable $X_{k}$ determines the activation of sensor $k$ in the sensing phase
296 ($X_k=1$ if the sensor $k$ is active or 0 otherwise). $M^j_i$ is an integer
297 variable which measures the undercoverage for the coverage interval $i$
298 corresponding to sensor~$j$. In the same way, the overcoverage for the same
299 coverage interval is given by the variable $V^j_i$.
301 If we decide to sustain a level of coverage equal to $l$ all along the perimeter
302 of sensor $j$, we have to ensure that at least $l$ sensors involved in each
303 coverage interval $i \in I_j$ of sensor $j$ are active. According to the
304 previous notations, the number of active sensors in the coverage interval $i$ of
305 sensor $j$ is given by $\sum_{k \in A} a^j_{ik} X_k$. To extend the network
306 lifetime, the objective is to activate a minimal number of sensors in each
307 period to ensure the desired coverage level. As the number of alive sensors
308 decreases, it becomes impossible to reach the desired level of coverage for all
309 coverage intervals. Therefore we use variables $M^j_i$ and $V^j_i$ as a measure
310 of the deviation between the desired number of active sensors in a coverage
311 interval and the effective number. And we try to minimize these deviations,
312 first to force the activation of a minimal number of sensors to ensure the
313 desired coverage level, and if the desired level cannot be completely satisfied,
314 to reach a coverage level as close as possible to the desired one.
317 Our coverage optimization problem can then be mathematically expressed as follows:
319 \begin{equation} %\label{eq:ip2r}
322 \min \sum_{j \in S} \sum_{i \in I_j} (\alpha^j_i ~ M^j_i + \beta^j_i ~ V^j_i )&\\
323 \textrm{subject to :}&\\
324 \sum_{k \in A} ( a^j_{ik} ~ X_{k}) + M^j_i \geq l \quad \forall i \in I_j, \forall j \in S\\
326 \sum_{k \in A} ( a^j_{ik} ~ X_{k}) - V^j_i \leq l \quad \forall i \in I_j, \forall j \in S\\
328 % \Theta_{p}\in \mathbb{N}, &\forall p \in P\\
329 % U_{p} \in \{0,1\}, &\forall p \in P\\
330 X_{k} \in \{0,1\}, \forall k \in A
335 $\alpha^j_i$ and $\beta^j_i$ are nonnegative weights selected according to the
336 relative importance of satisfying the associated level of coverage. For example,
337 weights associated with coverage intervals of a specified part of a region may
338 be given by a relatively larger magnitude than weights associated with another
339 region. This kind of integer program is inspired from the model developed for
340 brachytherapy treatment planning for optimizing dose distribution
341 \cite{0031-9155-44-1-012}. The integer program must be solved by the leader in
342 each subregion at the beginning of each sensing phase, whenever the environment
343 has changed (new leader, death of some sensors). Note that the number of
344 constraints in the model is constant (constraints of coverage expressed for all
345 sensors), whereas the number of variables $X_k$ decreases over periods, since we
346 consider only alive sensors (sensors with enough energy to be alive during one
347 sensing phase) in the model.
349 \section{Performance Evaluation and Analysis}
352 \subsection{Simulation Settings}
353 \label{ch5:sec:04:01}
355 The WSN area of interest is supposed to be divided into 16~regular subregions. %and we use the same energy consumption than in our previous work~\cite{Idrees2}.
356 Table~\ref{table3} gives the chosen parameters settings.
359 \caption{Relevant parameters for network initialization.}
362 % used for centering table
364 % centered columns (4 columns)
366 Parameter & Value \\ [0.5ex]
369 % inserts single horizontal line
370 Sensing field & $(50 \times 25)~m^2 $ \\
372 WSN size & 100, 150, 200, 250, and 300~nodes \\
374 Initial energy & in range 500-700~Joules \\
376 Sensing period & duration of 60 minutes \\
377 $E_{th}$ & 36~Joules\\
380 $\alpha^j_i$ & 0.6 \\
381 % [1ex] adds vertical space
387 % is used to refer this table in the text
391 To obtain experimental results which are relevant, simulations with five
392 different node densities going from 100 to 300~nodes were performed considering
393 each time 25~randomly generated networks. The nodes are deployed on a field of
394 interest of $(50 \times 25)~m^2 $ in such a way that they cover the field with a
395 high coverage ratio. Each node has an initial energy level, in Joules, which is
396 randomly drawn in the interval $[500-700]$. If its energy provision reaches a
397 value below the threshold $E_{th}=36$~Joules, the minimum energy needed for a
398 node to stay active during one period, it will no more participate in the
399 coverage task. This value corresponds to the energy needed by the sensing phase,
400 obtained by multiplying the energy consumed in active state (9.72 mW) with the
401 time in seconds for one period (3600 seconds), and adding the energy for the
402 pre-sensing phases. According to the interval of initial energy, a sensor may
403 be active during at most 20 periods.
406 The values of $\alpha^j_i$ and $\beta^j_i$ have been chosen to ensure a good
407 network coverage and a longer WSN lifetime. We have given a higher priority to
408 the undercoverage (by setting the $\alpha^j_i$ with a larger value than
409 $\beta^j_i$) so as to prevent the non-coverage for the interval~$i$ of the
410 sensor~$j$. On the other hand, we have assigned to
411 $\beta^j_i$ a value which is slightly lower so as to minimize the number of active sensor nodes which contribute
412 in covering the interval.
414 We applied the performance metrics, which are described in chapter 3, section \ref{ch3:sec:04:04} in order to evaluate the efficiency of our approach. We used the modeling language and the optimization solver which are mentioned in chapter 3, section \ref{ch3:sec:04:02}. In addition, we employed an energy consumption model, which is presented in chapter 3, section \ref{ch3:sec:04:03}.
417 \subsection{Simulation Results}
418 \label{ch5:sec:04:02}
420 In order to assess and analyze the performance of our protocol we have implemented PeCO protocol in OMNeT++~\cite{ref158} simulator. Besides PeCO, three other protocols, described in the next paragraph, will be evaluated for comparison purposes.
421 %The simulations were run on a laptop DELL with an Intel Core~i3~2370~M (2.4~GHz) processor (2 cores) whose MIPS (Million Instructions Per Second) rate is equal to 35330. To be consistent with the use of a sensor node based on Atmels AVR ATmega103L microcontroller (6~MHz) having a MIPS rate equal to 6, the original execution time on the laptop is multiplied by 2944.2 $\left(\frac{35330}{2} \times \frac{1}{6} \right)$. The modeling language for Mathematical Programming (AMPL)~\cite{AMPL} is employed to generate the integer program instance in a standard format, which is then read and solved by the optimization solver GLPK (GNU linear Programming Kit available in the public domain) \cite{glpk} through a Branch-and-Bound method.
422 As said previously, the PeCO is compared with three other approaches. The first one, called DESK, is a fully distributed coverage algorithm proposed by \cite{DESK}. The second one, called GAF~\cite{GAF}, consists in dividing the monitoring area into fixed squares. Then, during the decision phase, in each square, one sensor is chosen to remain active during the sensing phase. The last one, the DiLCO protocol~\cite{Idrees2}, is an improved version of a research work we presented in~\cite{ref159}. Let us notice that PeCO and DiLCO protocols are based on the same framework. In particular, the choice for the simulations of a partitioning in 16~subregions was chosen because it corresponds to the configuration producing the better results for DiLCO. The protocols are distinguished from one another by the formulation of the integer program providing the set of sensors which have to be activated in each sensing phase. DiLCO protocol tries to satisfy the coverage of a set of primary points, whereas PeCO protocol objective is to reach a desired level of coverage for each sensor perimeter. In our experimentations, we chose a level of coverage equal to one ($l=1$).
426 \subsubsection{Coverage Ratio}
427 \label{ch5:sec:04:02:01}
429 Figure~\ref{fig333} shows the average coverage ratio for 200 deployed nodes
430 obtained with the four protocols. DESK, GAF, and DiLCO provide a slightly better
431 coverage ratio with respectively 99.99\%, 99.91\%, and 99.02\%, compared to the 98.76\%
432 produced by PeCO for the first periods. This is due to the fact that at the
433 beginning the DiLCO protocol puts to sleep status more redundant sensors (which
434 slightly decreases the coverage ratio), while the three other protocols activate
435 more sensor nodes. Later, when the number of periods is beyond~70, it clearly
436 appears that PeCO provides a better coverage ratio and keeps a coverage ratio
437 greater than 50\% for longer periods (15 more compared to DiLCO, 40 more
438 compared to DESK). The energy saved by PeCO in the early periods allows later a
439 substantial increase of the coverage performance.
444 \includegraphics[scale=0.5] {Figures/ch5/R/CR.eps}
445 \caption{Coverage ratio for 200 deployed nodes.}
451 \subsubsection{Active Sensors Ratio}
452 \label{ch5:sec:04:02:02}
454 Having the less active sensor nodes in each period is essential to minimize the
455 energy consumption and thus to maximize the network lifetime. Figure~\ref{fig444}
456 shows the average active nodes ratio for 200 deployed nodes. We observe that
457 DESK and GAF have 30.36 \% and 34.96 \% active nodes for the first fourteen
458 rounds and DiLCO and PeCO protocols compete perfectly with only 17.92 \% and
459 20.16 \% active nodes during the same time interval. As the number of periods
460 increases, PeCO protocol has a lower number of active nodes in comparison with
461 the three other approaches, while keeping a greater coverage ratio as shown in
466 \includegraphics[scale=0.5]{Figures/ch5/R/ASR.eps}
467 \caption{Active sensors ratio for 200 deployed nodes.}
471 \subsubsection{The Energy Consumption}
472 \label{ch5:sec:04:02:03}
474 We studied the effect of the energy consumed by the WSN during the communication,
475 computation, listening, active, and sleep status for different network densities
476 and compared it for the four approaches. Figures~\ref{fig3EC}(a) and (b)
477 illustrate the energy consumption for different network sizes and for
478 $Lifetime95$ and $Lifetime50$. The results show that our PeCO protocol is the
479 most competitive from the energy consumption point of view. As shown in both
480 figures, PeCO consumes much less energy than the three other methods. One might
481 think that the resolution of the integer program is too costly in energy, but
482 the results show that it is very beneficial to lose a bit of time in the
483 selection of sensors to activate. Indeed the optimization program allows to
484 reduce significantly the number of active sensors and so the energy consumption
485 while keeping a good coverage level.
489 \begin{tabular}{@{}cr@{}}
490 \includegraphics[scale=0.475]{Figures/ch5/R/EC95.eps} & \raisebox{2.75cm}{(a)} \\
491 \includegraphics[scale=0.475]{Figures/ch5/R/EC50.eps} & \raisebox{2.75cm}{(b)}
493 \caption{Energy consumption per period for (a)~$Lifetime_{95}$ and (b)~$Lifetime_{50}$.}
499 \subsubsection{The Network Lifetime}
500 \label{ch5:sec:04:02:04}
502 We observe the superiority of PeCO and DiLCO protocols in comparison with the
503 two other approaches in prolonging the network lifetime. In
504 Figures~\ref{fig3LT}(a) and (b), $Lifetime95$ and $Lifetime50$ are shown for
505 different network sizes. As highlighted by these figures, the lifetime
506 increases with the size of the network, and it is clearly largest for DiLCO
507 and PeCO protocols. For instance, for a network of 300~sensors and coverage
508 ratio greater than 50\%, we can see on Figure~\ref{fig3LT}(b) that the lifetime
509 is about twice longer with PeCO compared to DESK protocol. The performance
510 difference is more obvious in Figure~\ref{fig3LT}(b) than in
511 Figure~\ref{fig3LT}(a) because the gain induced by our protocols increases with
512 time, and the lifetime with a coverage of 50\% is far longer than with
517 \begin{tabular}{@{}cr@{}}
518 \includegraphics[scale=0.475]{Figures/ch5/R/LT95.eps} & \raisebox{2.75cm}{(a)} \\
519 \includegraphics[scale=0.475]{Figures/ch5/R/LT50.eps} & \raisebox{2.75cm}{(b)}
521 \caption{Network Lifetime for (a)~$Lifetime_{95}$ and (b)~$Lifetime_{50}$.}
525 Figure~\ref{figLTALL} compares the lifetime coverage of our protocols for
526 different coverage ratios. We denote by Protocol/50, Protocol/80, Protocol/85,
527 Protocol/90, and Protocol/95 the amount of time during which the network can
528 satisfy an area coverage greater than $50\%$, $80\%$, $85\%$, $90\%$, and $95\%$
529 respectively, where the term Protocol refers to DiLCO or PeCO. Indeed there are applications
530 that do not require a 100\% coverage of the area to be monitored. PeCO might be
531 an interesting method since it achieves a good balance between a high level
532 coverage ratio and network lifetime. PeCO always outperforms DiLCO for the three
533 lower coverage ratios, moreover the improvements grow with the network
534 size. DiLCO is better for coverage ratios near 100\%, but in that case PeCO is
535 not ineffective for the smallest network sizes.
538 \centering \includegraphics[scale=0.5]{Figures/ch5/R/LTa.eps}
539 \caption{Network lifetime for different coverage ratios.}
548 In this chapter, we have studied the problem of Perimeter-based Coverage Optimization in
549 WSNs. We have designed a new protocol, called Perimeter-based Coverage Optimization, which
550 schedules nodes' activities (wake up and sleep stages) with the objective of
551 maintaining a good coverage ratio while maximizing the network lifetime. This
552 protocol is applied in a distributed way in regular subregions obtained after
553 partitioning the area of interest in a preliminary step. It works in periods and
554 is based on the resolution of an integer program to select the subset of sensors
555 operating in active status for each period. Our work is original in so far as it
556 proposes for the first time an integer program scheduling the activation of
557 sensors based on their perimeter coverage level, instead of using a set of
558 targets/points to be covered. We have carried out several simulations to evaluate the proposed protocol. The simulation results show that PeCO is more energy-efficient than other approaches, with respect to lifetime, coverage ratio, active sensors ratio, and
561 We plan to extend our framework so that the schedules are planned for multiple
563 %in order to compute all active sensor schedules in only one step for many periods;
564 We also want to improve our integer program to take into account heterogeneous
565 sensors from both energy and node characteristics point of views.
566 %the third, we are investigating new optimization model based on the sensing range so as to maximize the lifetime coverage in WSN;
567 Finally, it would be interesting to implement our protocol using a
568 sensor-testbed to evaluate it in real world applications.