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Optimal Water Pipe Replacement Policy

**Author(s)**Leave a comment

^{*}, Chukwudi J. Ogbonna

^{}, Geoffrey U. Ugwuanyim

^{}, Hycinth C. Iwu

^{}, Okechukwu B. Nwanyibuife

^{}

*λ*(t) [failure rate], the reliability R(t) and the optimal time of replacement and they were achieved. It was observed that the failure rate of the pipes increases with time while their reliability deteriorates with time. Hence, the Optimal replacement policy is that each pipe should be replaced after 4

^{th}break when the reliability = 0.0011.

KEYWORDS

1. Introduction

Water distribution network is a network consisting of pipes, valves and pumps that distribute water to the end users [1] [2] . In water distribution some components are made redundant which makes water supply failure not to be noticed immediately when pipe failure occurs. Pipes are of different types and sizes. In this paper, our interest is on three types of pipes namely:

1) Asbestos-concrete (AC) pipes,

2) Unplastisized polyvinyl chloride (UPVC) or plastic pipes and

3) Galvanized Iron pipes (GVI).

These pipes are further divided into mains, branches and terminals. Mains are of different lengths and diameters ranging from 13 ft to 20 ft and 200 mm to 600 mm. They carry water directly from the pumping station and the distribution storage. Branches have a diameter ranging from 75 mm to 150 mm, but of the same length with the mains. They carry water from the mains to various terminals. Terminals also have the same length as others but have a diameter ranging from 25 mm to 50 mm. They are called service lines in the network. The terminals convey water to the end-users and they are the smallest in size but the largest in number. Table 1 shows the type of water distribution pipes.

Each of the types of pipes in Table 1 has its advantages and shortcomings as presented in Table 2.

The major problems of the GVI pipes are bulkiness, rusting and expensiveness compared to the other two types. Majority of their failure result from rusting. UPVC is fast replacing GVI pipes because of their portability and durability.

Many factors are responsible for water pipe breaks. For the purpose of this paper, these factors are divided into internal and external factors, which are collectively called covariates. Internal factors: Internal factors include the pressure exerted by the flowing water in the pipe; the action of chemicals used in the water treatment; the diameter of the pipes and the intrinsic material of the pipes etc. Pressure exerted by water over a long period of time on pipes leads to their break and this pressure is inversely related to the diameter of pipes. The pressure

Table 1. Types of water distribution pipes.

Table 2. Water distribution pipes, advantages and disadvantages.

is also intensified, as the pipes are located nearer to the source and reduces as the length of the pipes increases. External factors: External factors include the soil type, topography, lay-dept, shock and rust. These factors are called external because they occur outside the pipes. The nature of soil in which the pipe is laid determines the rate of pipe’s break etc. The rates at which these factors occur influence the maintenance decisions.

Enugu State Water Corporation Enugu

Water generation and distribution are the sole concern of the water Generation unit, Enugu State Water Corporation Enugu. The replacement and repair functions are the sole responsibilities of the engineering and plumbing units. The pressure under which the pumps distribute water ranges from 6 bars to 16 bars. Frequency of pipe breaks depend on the following factors namely; lay depth, topography, intrinsic material of the pipes, pressure, diameter of the pipes, lay location etc. Period of replacement: pipes are replaced as they break and the rule of thumb is extensively used. Maintenance actions include periodic greasing of nuts and bolts, replacement or repair of failed pipes. In most cases, the maintenances are done on demand, as there is no regularity on the time limit for the maintenance services. But since pipes constitute the bulk of the money cost of the water network distribution system, there is a need to develop a failure model to detect the probability of failure at any given time, the failure rate, the reliability of the pipes and the optimal replacement time of the pipes to avoid waste of water resources.

[1] [2] used non-homogeneous Poisson process to model the pipe failure. They were of opinion that power law process model (λ(t) = abt^{b}^{−1}) can be used to describe the intensity of a NHPP. They define intensity as the mean number of failure, N(t), per unit time and that once the intensity has been estimated the number of failures in a given time period is Poisson.

[3] [4] observed that if the parameter b is between 0 and 1, then the network is improving, but if b > 1, it shows a deteriorating network. The model parameters can be determined using either graphical or analytical analysis. We can linearized the mean value function M(t) by taking the logarithm of both sides to obtained $\mathrm{ln}M\left(t\right)=\mathrm{ln}\left(a\right)+b\mathrm{ln}\left(t\right)$ , and a plot lnM(t) versus ln(t) should be a straight line with intercept ln(a) and slop b.

Water utilities are concerned with large number of main breaks and the resulting direct and indirect costs due to deterioration. These contribute to frequent breaks and resulting repair/replacement and rehabilitation costs [5] . They observed that replacement represents large capital investment. They suggested that if an estimator that can track the replacement time will be developed; such an estimator will be of great use to practicing engineers. [6] did a work on optimal replacement policy for stochastically failing equipment inaccessible to inspection. The policy was characterized by a single parameter, N. If equipment age is less than N, the appropriate action is to do nothing; if equal to N, the appropriate action is to replace the equipment. [7] obtained the optimal replacement policy by minimizing the average annual cost of equipment whose maintenance cost is a function increasing with time and whose scrap value is known, and their calculations were based on average annual cost incurred on the item. They assert that the item should be replaced when the average annual cost is minimal.

Water distribution pipes are repairable system because some maintenance action of repair can be done on them to restore the operation of the pipes after failures. [8] [9] [10] observed that a repairable system is a system which, after failing to perform its functions satisfactorily, can be restored to fully satisfactory performance by any method other than replacement of the entire system. Repairable systems shared the property that they could be repaired by replacing some failed components and returned to regular operation. Sometimes, minimal repairs bring the system reliability back to the same level it had before the failure, while ‘perfect’ repairs bring the reliability back to the state of the system at the start of the operation [11] [12] . The intensity and mean value functions of a power law process PLP are λ(t; M, β) = Mβt^{B}^{−1} and V(t; M, β) = Mt^{β}; M, β > 0. β determines how reliability decays or grows. If β < 1, the intensity function decreases over time and the reliability improves. If β = 1, the reliability remains the same over time, but if β > 1, the reliability declines and intensity increases. Again, if β > 1, we have NHPP and for β = 1, we have HPP. λ(t) is an increasing concave (straight, convex) curve if 1 < β < 2 [13] [14] [15] .

2. Overview of Poisson Process/Reliability

The Poisson Process provides a realistic model for many random phenomena. Since values of a Poisson random variable are the non-negative integers, any random phenomenon for which count of some sort is of interest is a candidate for modelling by assuming a Poisson distribution [16] , thus, the first event counted by N_{s}(.) takes place after an exponential amount of time with parameter λ; the rest of the inter event times are iid exponential with parameter λ [17] . A Poisson process is a renewal process for which the underlying distribution is exponential. A renewal process is a sequence of independent identically distributed non-negative random variables, X_{1}, X_{2}, …, which, with probability 1, are not all zeros [18] . They assert that the Poisson process arises quite naturally in reliability and life testing situations when the underlying life distribution is exponential. [19] observed that the original use of the term “reliability” was purely qualitative and that was why aerospace engineers recognized the need to have more than one engine on an airplane and drivers keep spare tyres in their vehicles without any precise measurement of the failure rate. But [20] were of opinion that reliability is the probability that a component or a system will perform its intended function under specified environmental conditions with time. They assert that the problem of assuring and maintaining reliability has many facets, which include: original equipment design; control of quality of products during production, life testing and design modifications.

Data Presentation

In this section, we present the data that is used for this work in Table 3.

3. Data Analysis

$t=2005\text{\hspace{0.17em}}\text{-}\text{\hspace{0.17em}}2015=10\text{\hspace{0.17em}}\text{years}$ (1)

$\lambda =\frac{{\displaystyle \sum {x}_{i}}}{N}=\frac{18}{20}=0.9;\text{\hspace{0.17em}}\text{\hspace{0.17em}}i=1,2,\cdots ,18;\text{\hspace{0.17em}}N=1,2,\cdots ,20$ (2)

${\lambda}^{c}=\frac{0.9}{10}=0.09;\text{\hspace{0.17em}}\text{\hspace{0.17em}}{\lambda}^{c}=\text{failureperunittime}$ (3)

We present how the parameters of the model were determined in Table 4.

The graphic method of determining the parameters of the water pipe failure model is presented in Figure 1.

$\mathrm{ln}a=-2.4\Rightarrow a=\mathrm{exp}\left(-2.4\right)=0.09$ (4)

$b=\frac{1.60}{1.575}=1.02$ (5)

Table 3. Type of pipe, Installation period, Replacement and number of Breaks.

Table 4. Determination of the Parameters of the Model.

Figure 1. Graph of lnL(t) versus ln(t).

Hence

${p}_{n}\left(t\right)=\mathrm{exp}\left(-0.09{t}^{1.02}\right){\left(\frac{0.09{t}^{1.02}}{n!}\right)}^{n};\text{\hspace{0.17em}}\text{\hspace{0.17em}}\left(n,t\right)=0,1,2,\cdots ,10$ (6)

${p}_{0}\left(1\right)=\mathrm{exp}\left(-0.09\right)=0.9139$ (7)

${p}_{1}\left(1\right)=\mathrm{exp}\left(-0.09\right)\left(0.09\right)=0.0823$ (8)

${p}_{2}\left(2\right)=\mathrm{exp}\left(-0.1825\right)\frac{{\left(0.1825\right)}^{2}}{2!}=0.0139$ (9)

$\vdots $

${p}_{10}\left(10\right)=\mathrm{exp}\left(-0.9424\right)\frac{{\left(0.9424\right)}^{10}}{10!}=0.000$ (10)

3.1. Water Pipe Failure Model

Since b > 1, then, our model assumes NHPP (λ(t)).

Equation (6) is the water pipe failure model, where p = probability; n = the number of failures; t = the time in years; a = 0.09 and b = 1.02 are the parameters of the model and a, b, t > 0.

3.2. The Reliability Function R(t)

$R\left(t\right)=\frac{{p}_{n}\left(t\right)}{\lambda \left(t\right)}$ (11)

3.3. Determination of Optimal Time of Replacement

A reliability approach is used here to determine the optimal time of replacement of pipes. Reliability approach has never been used to determine the optimal water pipe replacement policy. The pipe should be replaced a little time before the reliability becomes zero. Continuous used of the pipe when the reliability become zero add more to the cost because the failure rate λ(t) increases rapidly as the reliability R(t) becomes zero. Hence, t (time in years) is optimal at the least reliability R(t).

4. Interpretation of Results

Form the data collected from Enugu State Water Corporation Enugu we obtain the parameters of our model “a” and “b” and use them to generate a table for the probability of number of failure at any given time t. Also failure rate and reliability of the pipes were determined and presented in Tables 4-7 respectively.

Result A:

${p}_{n}\left(t\right)=\mathrm{exp}\left(-0.09{t}^{1.02}\right){\left(\frac{0.09{t}^{1.02}}{n!}\right)}^{n};\text{\hspace{0.17em}}\text{\hspace{0.17em}}\left(t,n\right)=1,\cdots ,10$ (12)

The probability of the number of failure of pipes at a given time is presented in Table 5 below.

Result B:

$\lambda \left(t\right)=\left(0.0918\right){t}^{0.02}$ (13)

The computation of the intensity function λ(t) is presented in Table 6.

Table 6 shows that the intensity function, λ(t), increases with time.

Result C:

$R\left(t\right)=\frac{{p}_{n}\left(t\right)}{\lambda \left(t\right)}$ (14)

In Table 7, we present the computation of reliability, R(t), of the water pipes.

Table 5. Probability of number of failure at Time t.

Table 6. Computation of the Intensity Function λ(t).

Table 7. Computation of the Reliability function R(t).

Table 7 above shows that the reliability R(t) of the pipes deteriorates with time while the failure rate of the pipes increases with time. The pipe should be replaced at the 4^{th} break when the reliability of the pipes is 0.0011. Hence, it is most reasonable to replace the pipe when the reliability is very close to zero.

5. Conclusion

In this paper, we developed water pipe failure model and the optimal water pipe replacement time (policy) of the pipes. The water pipe failure model was a Non-homogenous Poisson process and reliability has never been used to determine optimal replacement policy on a repairable system. We also obtained the intensity function λ(t) [failure rate] of the pipes. From this work, it was observed that the failure rate of the pipes increases with time while their reliability deteriorates with time. Hence, the Optimal replacement policy is that the pipe should be replaced after the 4^{th} break when the reliability = 0.0011.

Conflicts of Interest

The authors declare no conflicts of interest.

Cite this paper

*Open Journal of Optimization*,

**7**, 41-49. doi: 10.4236/ojop.2018.72002.

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