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==Fleet Analysis==
#REDIRECT [[Fleet Data Analysis]]
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Fleet analysis is similar to the repairable systems analysis described previously. The main difference is that a fleet of systems is considered and the models are applied to the fleet failures rather than to the system failures. In other words, repairable system analysis models the number of system failures versus system time; whereas fleet analysis models the number of fleet failures versus fleet time.
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The main motivation for fleet analysis is to enable the application of the Crow Extended model for fielded data. In many cases, reliability improvements might be necessary on systems that are already in the field. These types of reliability improvements are essentially delayed fixes (BD modes) as described in Chapter 9.
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Recall from Chapter 9 that in order to make projections using the Crow Extended model, the  <math>\beta </math>  of the combined A and BD modes should be equal to 1. Since the failure intensity in a fielded system might be changing over time (e.g. increasing if the system wears out), this assumption might be violated. In such a scenario, the Crow Extended model cannot be used. However, if a fleet of systems is considered and the number of fleet failures versus fleet time is modeled, the failures might become random. This is because there is a mixture of systems within a fleet, new and old, and when the failures of this mixture of systems are viewed from a cumulative fleet time point of view, they may be random. Figures Repairable and Fleet illustrate this concept. Figure Repairable shows the number of failures over system age. It can be clearly seen that as the systems age, the intensity of the failures increases (wearout). The superposition system line, which brings the failures from the different systems under a single timeline, also illustrates this observation. On the other hand, if you take the same four systems and combine their failures from a fleet perspective, and consider fleet failures over cumulative fleet hours, then the failures seem to be random. Figure Fleet illustrates this concept in the System Operation plot when you consider the Cum. Time Line. In this case, the  <math>\beta </math>  of the fleet will be equal to 1 and the Crow Extended model can be used for quantifying the effects of future reliability improvements on the fleet.
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[[Image:rga13.5.png|thumb|center|300px|Repairable System Operation plot.]]
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[[Image:rga13.6.png|thumb|center|300px|Fleet System Operation plot.]]
{{methodology fleet rsa}}
 
{{data analysis fleet rsa}}
 
===Applying the Crow Extended Model to Fleet Data===
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As it was mentioned previously, the main motivation of the fleet analysis is to apply the Crow Extended model for in-service reliability improvements. The methodology to be used is identical to the application of the Crow Extended model for Grouped Data described in Chapter 9. Consider the fleet data in Table 13.4. In order to apply the Crow Extended model, put  <math>N=37</math>  failure times on a cumulative time scale over  <math>(0,T)</math> , where  <math>T=52110</math> . In the example, each  <math>{{T}_{i}}</math>  corresponds to a failure time  <math>{{X}_{ij}}</math> . This is often not the situation. However, in all cases the accumulated operating time  <math>{{Y}_{q}}</math>  at a failure time  <math>{{X}_{ir}}</math>  is:
 
::<math>\begin{align}
  & {{Y}_{q}}= & {{X}_{i,r}}+\underset{j=1}{\overset{r-1}{\mathop \sum }}\,{{T}_{j}},\ \ \ q=1,2,\ldots ,N \\
& N= & \underset{j=1}{\overset{K}{\mathop \sum }}\,{{N}_{j}} 
\end{align}</math>
 
 
And  <math>q</math>  indexes the successive order of the failures. Thus, in this example  <math>N=37,\,{{Y}_{1}}=1396,\,{{Y}_{2}}=5893,\,{{Y}_{3}}=6418,\ldots ,{{Y}_{37}}=52110</math> . See Table 13.6.
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{|style= align="center" border="1"
|-
|colspan="7" style="text-align:center"|Table 13.6 - Test-find-test fleet data
|-
!<math>q</math>
!<math>{{Y}_{q}}</math>
!Mode
!
!<math>q</math>
!<math>{{Y}_{q}}</math>
!Mode
|-
|1|| 1396|| BD1|| || 20|| 26361|| BD1
|-
|2|| 5893|| BD2|| || 21|| 26392|| A
|-
|3|| 6418|| A|| || 22|| 26845|| BD8
|-
|4|| 7650|| BD3|| || 23|| 30477|| BD1
|-
|5|| 7877|| BD4|| || 24|| 31500|| A
|-
|6|| 8012|| BD2|| || 25|| 31661|| BD3
|-
|7|| 8031|| BD2|| || 26|| 31697|| BD2
|-
|8|| 8843|| BD1|| || 27|| 36428|| BD1
|-
|9|| 10867|| BD1|| || 28|| 40223|| BD1
|-
|10|| 11183|| BD5|| || 29|| 40803|| BD9
|-
|11|| 11810|| A|| || 30|| 42656|| BD1
|-
|12|| 11870|| BD1|| || 31|| 42724|| BD10
|-
|13|| 16139|| BD2|| || 32|| 44554|| BD1
|-
|14|| 16104|| BD6|| || 33|| 45795|| BD11
|-
|15|| 18178|| BD7|| || 34|| 46666|| BD12
|-
|16|| 18677|| BD2|| || 35|| 48368|| BD1
|-
|17|| 20751|| BD4|| || 36|| 51924|| BD13
|-
|18|| 20772|| BD2|| || 37|| 52110|| BD2
|-
|19|| 25815|| BD1|| || ||
|}
 
Each system failure time in Table 13.4 corresponds to a problem and a cause (failure mode). The management strategy can be to not fix the failure mode (A mode) or to fix the failure mode with a delayed corrective action (BD mode). There are  <math>{{N}_{A}}=4</math>  failures due to A failure modes. There are  <math>{{N}_{BD}}=33</math>  total failures due to  <math>M=13</math>  distinct BD failure modes. Some of the distinct BD modes had repeats of the same problem. For example, mode BD1 had 12 occurrences of the same problem. Therefore, in this example, there are 13 distinct corrective actions corresponding to 13 distinct BD failure modes.
The objective of the Crow Extended model is to estimate the impact of the 13 distinct corrective actions.The analyst will choose an average effectiveness factor (EF) based on the proposed corrective actions and historical experience. Historical industry and government data supports a typical average effectiveness factor  <math>\overline{d}=.70</math>  for many systems. In this example, an average EF of <math>\bar{d}=0.4</math>  was assumed in order to be conservative regarding the impact of the proposed corrective actions. Since there are no BC failure modes (corrective actions applied during the test), the projected failure intensity is:
 
::<math>\widehat{r}(T)=\left( \frac{{{N}_{A}}}{T}+\underset{i=1}{\overset{M}{\mathop \sum }}\,(1-{{d}_{i}})\frac{{{N}_{i}}}{T} \right)+\overline{d}h(T)</math>
 
 
The first term is estimated by:
 
::<math>{{\widehat{\lambda }}_{A}}=\frac{{{N}_{A}}}{T}=0.000077</math>
 
 
The second term is:
 
::<math>\underset{i=1}{\overset{M}{\mathop \sum }}\,(1-{{d}_{i}})\frac{{{N}_{i}}}{T}=0.00038</math>
 
 
This estimates the growth potential failure intensity:
 
::<math>\begin{align}
  & {{\widehat{\gamma }}_{GP}}(T)= & \frac{{{N}_{A}}}{T}+\underset{i=1}{\overset{M}{\mathop \sum }}\,(1-{{d}_{i}})\frac{{{N}_{i}}}{T} \\
& = & 0.00046 
\end{align}</math>
 
To estimate the last term  <math>\overline{d}h(T)</math>  of the Crow Extended model, partition the data in Table 13.6 into intervals. This partition consists of  <math>D</math>  successive intervals. The length of the  <math>{{q}^{th}}</math>  interval is  <math>{{L}_{q}},</math>  <math>\,q=1,2,\ldots ,D</math> . It is not required that the intervals be of the same length, but there should be several (e.g. at least 5) cycles per interval on average. Also, let  <math>{{S}_{1}}={{L}_{1}},</math>  <math>{{S}_{2}}={{L}_{1}}+{{L}_{2}},\ldots ,</math>  etc. be the accumulated time through the  <math>{{q}^{th}}</math>  interval. For the  <math>{{q}^{th}}</math>  interval note the number of distinct BD modes,  <math>M{{I}_{q}}</math> , appearing for the first time,  <math>q=1,2,\ldots ,D</math> . See Table 13.7.
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{|style= align="center" border="1"
|-
|colspan="4" style="text-align:center"|Table 13.7 - Grouped data for distinct BD modes
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!Interval
!No. of Distinct BD Mode Failures
!Length
!Accumulated Time
|-
|1|| MI <math>_{1}</math> || L <math>_{1}</math> || S <math>_{1}</math>
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|2|| MI <math>_{2}</math>|| L <math>_{2}</math>|| S <math>_{2}</math>
|-
|.|| .|| .|| .
|-
|.|| .|| .|| .
|-
|.|| .|| .|| .
|-
|D|| MI <math>_{D}</math> || L <math>_{D}</math>|| S <math>_{D}</math>
|}
The term  <math>\widehat{h}(T)</math>  is calculated as  <math>\widehat{h}(T)=\widehat{\lambda }\widehat{\beta }{{T}^{\widehat{\beta }-1}}</math> and the values  <math>\widehat{\lambda }</math>  and  <math>\widehat{\beta }</math>  satisfy Eqns. (cc1) and (cc2). This is the grouped data version of the Crow-AMSAA model applied only to the first occurrence of distinct BD modes.
For the data in Table 13.6 the first 4 intervals had a length of 10000 and the last interval was 12110. Therefore,  <math>D=5</math> . This choice gives an average of about 5 overhaul cycles per interval. See Table 13.8.
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{|style= align="center" border="1"
|-
|colspan="4" style="text-align:center"|Table 13.8 - Grouped data for distinct BD modes from Table 13.6
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!Interval
!No. of Distinct BD Mode Failures
!Length
!Accumulated Time
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|1|| 4|| 10000|| 10000
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|2|| 3|| 10000|| 20000
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|3|| 1|| 10000|| 30000
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|4|| 0|| 10000|| 40000
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|5|| 5|| 12110|| 52110
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|Total|| 13||
|}
 
:Thus:
 
::<math>\begin{align}
  & \widehat{\lambda }= & 0.00330 \\
& \widehat{\beta }= & 0.76219 
\end{align}</math>
 
:This gives:
 
::<math>\begin{align}
  & \widehat{h}(T)= & \widehat{\lambda }\widehat{\beta }{{T}^{\widehat{\beta }-1}} \\
& = & 0.00019 
\end{align}</math>
 
Consequently, for  <math>\overline{d}=0.4</math>  the last term of the Crow Extended model is given by:
 
::<math>\overline{d}h(T)=0.000076</math>
 
 
The projected failure intensity is:
 
::<math>\begin{align}
  & \widehat{r}(T)= & \frac{{{N}_{A}}}{T}+\underset{i=1}{\overset{M}{\mathop \sum }}\,(1-{{d}_{i}})\frac{{{N}_{i}}}{T}+\overline{d}h(T) \\
& = & 0.000077+0.6\times (0.00063)+0.4\times (0.00019) \\
& = & 0.000533 
\end{align}</math>
 
 
This estimates that the 13 proposed corrective actions will reduce the number of failures per cycle of operation hours from the current  <math>\widehat{r}(0)=\tfrac{{{N}_{A}}+{{N}_{BD}}}{T}=0.00071</math>  to  <math>\widehat{r}(T)=0.00053.</math>  The average time between failures is estimated to increase from the current 1408.38 hours to 1876.93 hours.
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===Confidence Bounds===
For fleet data analysis using the Crow-AMSAA model, the confidence bounds are calculated using the same procedure as described in Section 5.4. For fleet data analysis using the Crow Extended model, the confidence bounds are calculated using the same procedure as described in Section 9.6.1.
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Latest revision as of 06:23, 23 August 2012