Fault diagnosis of an industrial plant using a Monte Carlo analysis coupled with systematic troubleshooting

Accepted Manuscript Fault diagnosis of an industrial plant using a Monte Carlo analysis coupled with systematic troubleshooting Irina Boiarkina, Nick Depree, Wei Yu, David I. Wilson, Brent R. Young PII:

S0956-7135(17)30113-5

DOI:

10.1016/j.foodcont.2017.02.061

Reference:

JFCO 5496

To appear in:

Food Control

Received Date: 1 August 2016 Revised Date:

2 February 2017

Accepted Date: 25 February 2017

Please cite this article as: Boiarkina I., Depree N., Yu W., Wilson D.I. & Young B.R., Fault diagnosis of an industrial plant using a Monte Carlo analysis coupled with systematic troubleshooting, Food Control (2017), doi: 10.1016/j.foodcont.2017.02.061. This is a PDF file of an unedited manuscript that has been accepted for publication. As a service to our customers we are providing this early version of the manuscript. The manuscript will undergo copyediting, typesetting, and review of the resulting proof before it is published in its final form. Please note that during the production process errors may be discovered which could affect the content, and all legal disclaimers that apply to the journal pertain.

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Fault Diagnosis of an Industrial Plant Using a Monte Carlo Analysis Coupled with Systematic Troubleshooting Irina Boiarkinaa , Nick Depreea , Wei Yua , David I. Wilsonb , Brent R. Younga,1 a Industrial

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Information and Control Centre, Chemical and Materials Engineering, University of Auckland, 2-6 Park Ave, Grafton, Auckland 1023, New Zealand b Auckland University of Technology, School of Engineering, Computing & Mathematical Sciences, Auckland 1142, Auckland

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Abstract

Efficiently troubleshooting a fortification issue at an industrial milk powder plant is a complex undertaking given the myriad of possible causes. Multiple causes, even when simple, are not

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easy to diagnose, however every single cause needs to be addressed in order to consistently meet product quality specifications. This paper uses statistical modelling in the form Monte Carlo simulations to investigate the probable causes for unexpected excessive product variation. This approach alone, refines but does not completely solve, the production issues, so a systematic approach was required to definitively solve other root causes. This two-step fault diagnosis approach ensured that all of the differing causes proposed by plant personnel could be addressed, and sound recommendations for good manufacturing operations could be made and adopted.

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1. Introduction

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Keywords: fault diagnosis, Monte Carlo, dairy, case study, quality, fortification

Many processing industries have recently seen a shift away from maximising production with

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process control to a focus on quality, and process analytical technology (PAT) has come to stand

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for the assessment and control of product quality. The popularity of PAT was partly due to

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the strong FDA encouragement in the US pharmaceutical industry (FDA, 2004), but since has

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spread to other manufacturing industries (Munir et al., 2015). The international dairy company

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Fonterra Co-operative Group Ltd, the world’s largest fluid milk processor, has recently been

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looking to accelerate the development and use of PAT tools to achieve ‘real time quality’ (RTQ),

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Email addresses: [email protected] (Irina Boiarkina), [email protected] (Nick Depree), [email protected] (Wei Yu), [email protected] (David I. Wilson), [email protected] (Brent R. Young) 1 Corresponding author

Preprint submitted to Elsevier

February 2, 2017

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combining the benefits of advanced process control (APC) with an explicit focus on quality (Hunter et al., 2012; Munir et al., 2015; Rimpil¨ainen et al., 2015). The attractions of real time quality are obvious. If one is confident that the product cur-

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rently being manufactured is to specification, then savings can be made on off-line subsequent

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testing, while simultaneously minimising the possibility of producing significant amounts of off-

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spec product that must be recycled or rejected. However the development of appropriate tools to

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achieve this requires that one understands the nature of the underlying quality issue in order to

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carry out the appropriate corrective action. From an analysis of historical poor quality events,

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it was decided that this work would concentrate on the timely identification and subsequent

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correction of faults. Whilst seemingly simple, practical fault diagnosis on large interconnected

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plants is complicated, and the natural human bias to search for a single phenomenological cause,

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(as opposed to multiple, single failures) is often unwarranted.

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Standard techniques for industrial fault diagnosis and monitoring can be found in Gertler

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(1998) and Chiang et al. (2001), those employing simple rule-based methods such as expert

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systems (Rich and Venkatasubramanian, 1987; Zahedi et al., 2011), or dynamic process modelling

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(Bertanza et al., 2013), or even data driven multi-variate methods such as principal components

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analysis (PCA) and multi-variate data analysis (Qin, 2012; Ralston et al., 2001; Singhal and

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Seborg, 2006; Li et al., 2011; Eslamloueyan, 2011). It may be prudent to distinguish between

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methodologies applied to a simulated process, such as the benchmark Tennessee Eastman plant

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(Yin et al., 2012; Lee, 2004; Gertler, 1998; Chiang et al., 2001), those applied at a pilot plant

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scale (Ruiz et al., 2001), and those applied on an actual industrial plant (Bertanza et al., 2013;

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Ralston et al., 2001; Zahedi et al., 2011; Ge et al., 2011). The latter often contain subtleties that

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are important to the overall success of the programme.

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When looking at it from the industrial point of view the method depends on its appropriateness to the end goal and the information available. Possible aims include: 1. Find general problems across the entire plant. This may include standard equipment fail-

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ures or abnormal operation. Data driven methods such as PCA and MVDA are appropriate here as they capture a large quantity of information simultaneously and are non-specific. However these techniques require knowing a ‘normal’ mode of operation, which is not always easily established.

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2. Troubleshoot a specific problem. The causes may be singular or multiple and varied. Ex-

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pert systems can be of some help here, as troubleshooting a specific issue may require

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knowledge specific to the process to explain it adequately. A dynamic model of the process

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for elucidating the exact cause, such as that used by Bertanza et al. (2013) when trou-

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bleshooting a wastewater treatment plant. General data processing methods can also be

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applied although they will result in black box models, sucha as PCA, that may be difficult

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to interpret.

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1.1. An application of fault diagnosis in the dairy industry

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This work considers an industrial milk powder plant where the product is fortified with

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specific ingredients in minute and carefully controlled quantities to the customer specification.

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However one of the added ingredients showed larger than expected concentration variations in

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the final product, with below-specification results.

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Initially it was unclear whether the variation was a fault, or a natural consequence from the

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normal processing. This uncertainty precluded the use of some data driven processing methods

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that require the identification of a ‘normal’ operating state, such as PCA. However a model of

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the fortification process could be used to establish whether the variation and below-specification

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results were probable or not, based on the variation of the inputs. This was combined with a

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Monte Carlo (MC) strategy of running simulations of the process model repeatedly and compar-

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ing with the available quality data, which was measured infrequently and difficult to trace back

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to the process conditions.

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Goldfeld and Dubi (1987) reviewed the use of the Monte Carlo method for reliability engi-

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neering within the manufacturing industry and an application of the Monte Carlo method for

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analysing manufacturing failures in electronic components is reported by Accumolli (1996). In

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this latter case it was used to estimate the percentage of the final product that could be expected

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fail, as the final product could not be tested. In both cases the failure causes were already known,

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and neither work looked at using the Monte Carlo method specifically for troubleshooting.

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Monte Carlo for uncertainty analysis has also been used for understanding penicillin V pro-

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duction by Biwer et al. (2005) and for analysing the uncertainty around wastewater treatment

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plant models by Sin et al. (2009). However, again both of these works look at the uncertainty

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propagating through the process. For penicillin production it was used for assessing the result-

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ing variability in the economics and environmental performance of the process, whilst for the

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wastewater treatment it was used for design modelling. Thus, the aim in both cases was not

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to troubleshoot and evaluate whether the variation was normal for the process or not. This

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troubleshooting aim is a novel aspect of this work.

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Where the broad Monte Carlo strategy was found to be ineffective, a case-by-case approach

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followed, made far more manageable by the reduction in the fault search-space by the broader

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approach used initially. This ensured that all aspects of the problem could be covered.This

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requires domain specific knowledge. For example, the troubleshooting of a distillation column re-

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quires case-by-case evaluation of possible column malfunction causes (Kister et al., 2007; Kister,

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2014). Similar case-by-case approaches can be taken for other operations such as pneumatic

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conveying and filter operation (Mills, 2016; Sparks and Chase, 2016). However, analysing each

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failure individually can be time consuming when each one can have multiple route causes, there-

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fore having a broad technique to eliminate as many of the potential causes as possible before

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carrying out a case-by-case analysis is very useful.

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During this fault diagnosis, we noted themes that could be generalised to troubleshooting at

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any industrial plant. We found that plant personnel had differing pre-conceived notions on the

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root causes of the problem and this meant that during the fault diagnosis the approach taken

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had to resolve the differences in opinion in order for any proposed solutions to be adopted at the

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plant. Using the Monte Carlo uncertainty analysis followed by individual analyses was effective

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at uncovering both single phenomenological and multiple single simple causes and capturing the

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quality issue holistically.

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The outline of this work is as follows. Section 2.1 describes the specific industrial problem used

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as a case study and lists the competing solution hypotheses. To resolve which potential problem

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was indeed the root cause, a Monte Carlo analysis was undertaken in Section 2.2. However the

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statistical analysis alone could not resolve all the potential causes, so a systematic cases-by case

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analysis was used in Section 3.5 and both strategies resulted in concrete operational changes

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outlined in Section 3.6. Finally a generalisation of this specific case study illustrating how it can

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be applied in other instances is given in Section 4.

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2. Theory

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2.1. Fault Description

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Milk powder is typically fortified during processing by the addition of several ingredients.

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These ingredients are normally added to the evaporator flow using a dedicated dosing system,

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as shown in Figure 1.

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The dosing system consists of two tanks, one for dosing and one for making up fresh solution

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of the ingredient to be ready for switch-over as shown in Figure 1. The target (denoted by an

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Figure 1: General process flow diagram of a milk dryer showing the location of the ingredient addition point in

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the process and the dosing system.

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asterisk superscript) solid mass of ingredient to be diluted for dosing can be calculated using a

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mass balance based on the mass of solids going through the evaporators in the milk, and the

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target concentration in the final milk powder (specified by the customer). The final milk powder

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is composed of the ingredient, the milk solids and a small amount of left over water. Using a

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mass balance approach, the target solid mass of ingredient to dissolve, m?I (kg), is, C ? V ? qE xs qD (1 − xm )(1 − L)

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m?I =

where C ? is the target milk powder ingredient concentration (mg/g milk powder), V ? is the

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target fill volume of the dosing tank used (m3 ), qD and qE are the expected dosing and evaporator

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flowrates respectively (m3 /hr and t/hr), xs is total solids fraction in the evaporator flow (%), xm

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is the final moisture content in the powder (%), and L is a factor used to account for ingredient

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losses (dimensionless), such as by degradation during processing, and is assumed in the region

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0.1 to 0.15. The estimates for the loss factor were obtained from in-situ historical studies carried

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out at the plants.

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Once the ingredient is made up to the required concentration in the dosing tank, the flow

rate was assumed to be controlled in ratio to the evaporator flow. One particular milk powder plant identified that the concentration of the ingredient showed

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unexpected, large concentration variations in the milk powder and unusually low concentration

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results, well below the specification limit. The (competing) hypotheses posed by different plant

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personnel for these two problems were:

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H1: The large variation in the final ingredient concentration was due to poor repeatability of the analytical technique used for measuring the ingredient concentration. H2: The large variation was due to inherent variations in the processing conditions (perhaps due

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to environmental disturbances) that were not sufficiently addressed by the control system.

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H3: The large variation and unexpected below specification results were due to unpredictable

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degradation of the ingredient during processing and subsequent storage.

Without further analysis, the available evidence was insufficient to support or reject these hy-

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potheses, thus preventing controls from being implemented. In part this was due to the fact

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that the concentration is measured infrequently, off-line, and with a variable multi-day delay,

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thus making it difficult to trace, troubleshoot and correlate with processing conditions. Hence a

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Monte Carlo uncertainty analysis was used to solve this dilemma.

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2.2. Monte Carlo Analysis to Establish the Source of Variation

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A Monte Carlo uncertainty analysis was used to address the three hypotheses stated in

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Section 2.1, namely to test if the observed variations are due to poor control or excessive variations

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in the incoming product streams.

The Monte Carlo strategy compares the actual probability density function (PDF) distribu-

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tion of the output, with that computed by propagating the input distributions through a model

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of the process (Saltelli et al., 2000) as shown in Figure 2. Such a simple, albeit computationally

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expensive, strategy can be used to estimate the output distributions through complicated non-

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linear systems without excessive approximation. The two requirements for implementation are a

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model, in this case given by the mass balance, and knowledge of the input variations which can

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be extracted from the plant historian.

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Rearranging Equation 1 to solve for the milk concentration in final product milk powder,

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C=

m∗ qD (1 − xm )(1 − L) V qE xs

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gives the predictive model used to propagate the input distributions through to the required

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output distribution in Figure 2.

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Each argument in the right hand side of Equation 2 (inputs in Figure 2) is quantified using

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historical plant data without having to make any additional assumptions about the underlying

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distributions. The following assumptions were used:

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Figure 2: Diagram of the Monte Carlo uncertainty analysis strategy for quantifying the milk powder ingredient

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1. For the variables qE , qD , xs and V , the plant historian was used to extract the data directly. Using sufficient data, the PDFs of each input can be regressed.

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concentration variation.

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2. The final moisture content, xm was assumed constant since it is both very tightly controlled,

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and given the magnitude relative to the other variables, could not have contributed more

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than 0.25 % variation to the final concentration.

3. The degradation factor, L, is poorly characterised but historically is assumed to be a 0.12

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for the specific plant. If the variation is large without accounting for variation in the losses,

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then unpredictable degradation is not required to explain the large output variation.

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4. The added mass of the ingredient used for dosing tank make-up, m∗, was constant across a

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specification with an expected normal three-sigma variation of 0.5% due to weighing error,

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based on historical work carried out at the plant. If the output PDF as computed from the Monte Carlo simulation differed significantly from

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the actual distribution, then either the postulated input distributions are a poor approximation

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(unlikely in this instance), or the model is deficient, or there are disturbance variables unac-

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counted for.

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After establishing input PDFs, several scenarios were examined to assess the uncertainty of

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the final ingredient concentration. The first scenario evaluated the concentration variation due

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to normal process variation, and this was used as the base case for comparison. Following that

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‘what-if?’ scenarios were simulated to evaluate the effect of possible solutions.

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3. Results and Discussion

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3.1. Input Probability Density Functions

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Due to commercial sensitivity, all processing variable values and associated units have been deliberately removed and/or normalised as this uses industrially confidential data. The dosing tank fill volume PDF shown in Figure 3a was regressed using five months of

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historical data. The bi-modal behaviour is due to the fact that actually two separate tanks were

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used; one being re-filled whilst the other tank was dosing. The two modes are most likely due

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to a slightly different fill level being used, as each tank is manually filled up to an inscribed

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mark on the tank. The fill level varies by up to 14%, and is always higher than designed for,

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assuming that the measured volume is calibrated correctly. The PDFs were converted to cumu-

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lative distribution functions (CDFs) for analysis. From the CDF in Figure 3a it was found that

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approximately 50% of the time, the tank is overfilled by 10% or more and that 95% of the time,

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the tank is overfilled by at least 6%. This is shown by the line drawn on the CDF of the tank

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volume in Figure 3a. Given that extra ingredient is added to compensate for processing losses,

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the additional ingredient could be compensating for over-dilution.

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Figure 3b shows the PDF and CDF functions for the evaporator feed total solids. The

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evaporator solids vary significantly and this variation was not accounted for during dosing control

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historically.

The evaporator feed and dosing flow rate PDFs and CDFs are shown in Figures 3c and 3d.

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Prior to this analysis it was assumed that the dosing flow rate was controlled in a specific ratio

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to the evaporator flow rate. The dosing flow rate should be exactly proportional to the evap-

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orator flow rate—when the evaporator flow rate increases by 10 % from the original value, the

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dosing flow rate should increase by 10 % as well to provide enough ingredient for the extra solids

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flow. However, the dosing flow rate only increased by 1 %, which would have been insufficient

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to maintain the required concentration of ingredient in the final milk powder. As a consequence

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of this investigation, the variation in the dosing flow rate was found to be far too small for it to

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be in ratio to the evaporator flow. This is shown diagrammatically in Figure 4. This, seemingly

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trivial oversight, was an unexpected result.

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However, the measured dosing flow rate did increase very slightly with the evaporator feed

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flow, most likely due to a venturi effect at the dosing point. The evaporator and dosing flow

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rates have a Spearman’s correlation coefficient of 0.84, and this was used in the Iman-Conover

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method (Iman and Conover, 1982), to generate a correlated sample for the analysis.

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Figure 3: Probability and cumulative density functions for a) dosing tank fill level b) total solids entering the

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evaporator c) flow rate to the evaporator d) dosing flow rate.

Figure 4: A comparison of the current normalised dosing flow rate to the evaporator flow rate overlayed with the design ratio (solid red line) that should be used for control. The correct ratio stipulates that a percentage increase in the evaporator flow should result in an equal percentage increase of the dosing flow rate.

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3.2. A Comparison of Actual Variation of Ingredient Concentration The first case investigated simulated the expected variation due to the normal processing

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conditions encountered at the plant. Figure 5 shows a comparison of the expected variation due

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to the natural input variations and subsequent processing, with and without analytical variation

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(red and orange curves respectively), and the actual variation found in the milk powder ingredient

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concentration (blue curve). For this simulation, a population of 50,000 data random points were

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used for each input. The realisation of the random variates were generated by passing uniformly

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distributed random numbers through the inverse cumulative distribution functions (iCDFs) of

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each input.

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The Kolmogorov-Smirnov test was used to compare the similarity between the actual and

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simulated distributions (Wilks, 1995). Even with the inclusion of the addition of the analytical

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variation to the processing variation, the distributions are statistically different with a p-value

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of 5.7×10−12 at the 95 % confidence level. The simulated distributions was found to be narrower

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than actual, which shows that the Monte Carlo simulation did not account for all possible sources

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of variation. However, both the simulated and actual distributions were right skewed with the

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mean above the mid-specification value (normalised to zero in the figure). Both the actual and

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simulated distributions also show that the concentration is more likely to be out of specification

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on the upper limit, as opposed to the lower limit. However, something other than the normal

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processing and analytical variation is contributing to the out-of-specification results, and thus a

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case-by-case analysis was used.

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Figure 5: Comparison of the distribution of the predicted output concentration using an MC analysis with the actual measured distribution of the data.

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The repeatability of the analytical technique had been quantified previously from historical 10

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work carried out at the plants, and the coefficient of variation was found to be 3.6 %. This is

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of the same order of magnitude as the standard deviation of the simulation which accounts for

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processing variation only, of 4.7 %. Figure 5 shows the expected output concentration if this

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analytical variation is added on top of the processing variation, assuming that it comes from nor-

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mally distributed data. As expected, it increases the total variation seen in the simulated results.

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The difference between the distributions, with and without analytical variation, is statistically

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significant at a 95 % confidence level with a p-value of 9.1×10−79 when using the two sample

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Kolmogorov-Smirnov test. This means that a reduction in the variation due to either processing,

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or the analytical technique, will decrease the final measured concentration variation in the milk

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powder.

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Consequently both hypotheses H1 and H2 by plant personnel contributed to the variation

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found in the milk powder, and that scenarios could be tested to make recommendations for

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improving the system operation. These are discussed in Sections 3.3 and 3.4. On the other

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hand if the variation due to the analytical technique was significantly larger than that due to

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processing, then any improvements in processing would end up being masked and therefore

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fruitless.

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However, neither the normal variation, nor the variation in the analytical technique explained

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the unexpected below-specification results that were defined as part of the problem. Furthermore,

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normal processing variation was unlikely to lead to any below-specification results, since Figure

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5 clearly indicates that off-specification results are far more probable on the high end given the

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normal processing variation. Thus in order to adequately address the concerns of the plant

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personnel, and find a clear explanation, the below-specification results were investigated case-

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by-case. This is discussed in Section 3.5.

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3.3. The Effect of Dosing Tank Fill Volume to the Concentration Variation

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Section 3.1 showed that because the dosing tanks are filled manually to a pre-specified mark,

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there is actually significant variation in the dosing tank fill volume, with the volume usually

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being larger than that designed. There was some concern that this manual operation was to

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blame, and it would be desirable to quantify the economic implications in order to balance the

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costs of implementing an automated filling procedure. To do this, a Monte Carlo simulation

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was performed where the tank fill volume input variable is replaced with the constant setpoint

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thereby removing the influence of the uncontrolled variations.

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Figure 6 shows the effect of filling the dosing tanks to 100% of the intended design volume.

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Figure 6: A comparison between the predicted distributions of the ingredient concentration in the milk powder with variable dosing tank fill volume (upper) and if the tank was filled exactly to the designed volume (lower).

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Interestingly if the tank is filled to the design volume, then this means that a significant portion

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of the results would be expected to violate the upper limit, approximately 16%. This implies that the plant processing losses (assumed to be 12%) may not be as high as

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previously estimated by the plant personnel, and that the current over-dilution compensates

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for this. Clearly some of the losses are not encountered during the processing so much as by

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unaccounted for dilution. Therefore, either the tank volume fill procedure should be better

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controlled, or the dosing flow rate should be adjusted based on the actual volume of water used

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to dissolve the ingredient.

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Maintaining a constant tank volume would not significantly reduce the concentration variation

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in the milk powder on its own. Therefore the reinstatement of ratio control was also investigated,

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discussed in the following section.

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3.4. The Effect of Ratio Control on Ingredient Concentration Variation

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Figure 7 shows a comparison of different processing changes that could be made and what

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impact they would have on the variation of the ingredient concentration. Proper ratio control

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could be instated, with the dosing flow rate changing in proportion to the evaporator flow rate,

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to account for the increase is solids being sent to the dryer. With the use of proper ratio control

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(Figure 7b), the distribution becomes significantly narrower (compared with Figure 7a), with the

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standard deviation reducing from 4.7 to 3.7 %. Furthermore, if the tank is filled to a consistent

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volume each time, then the variability decreases further, with the standard deviation reducing to

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3.1 % (see Figure 7c). Having the dosing flow rate ratio controlled and a constant tank volume

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would allow the plant to be operated closer to the upper limit.

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The distribution of the ingredient in the milk powder in Figure 7c now mirrors the total

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solids distribution (Figure 3b), and therefore if ratio control is implemented for the evaporator

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flow rate, it should be in ratio to mass solids flow, rather than the volumetric flowrate, as the

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water that contributes to the volumetric flow rate is removed during the drying process, leaving

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effectively only the solids behind.

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3.5. Case-by-Case Analyses

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The work in part was initiated due to unexpected below specification results. The broad fault

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diagnosis strategy found that off-specification results were more likely to be on the high limit

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due to normal process variation. However, the Monte Carlo analysis did not reveal a possible

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cause of the unexpectedly low below-specification results.

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Therefore, a case-by-case analysis was employed to investigate these intermittent occurrences,

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using the the cause-and-effect diagram shown in Figure 8. Given that the Monte Carlo analysis

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from Section 2.2 eliminated normal operation as being a possible cause, we looked for abnormal

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operating conditions. Diagrams and data of the operating variables at the time of the event were

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tracked and investigated, and the possible causes, shown in Figure 8, were eliminated one by one.

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The degradation hypothesis assumed that all relevant plant systems are functioning correctly,

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however, this was never verified for the low concentration results. Therefore, the dosing system,

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and all relevant plant systems, were explored during these specific runs to see if any abnormal

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behaviour was present at the time.

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During the case-by-case verification of normal system performance abnormal operations were

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found for very short durations that coincided with the extremely low test results. Two repeating

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themes were found for these results that were likely have caused them:

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2. Unintended mixing of different specification powders. This was also not picked up on using

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1. Temporary dosing suspension. This was not picked up on with the Monte Carlo analysis as the data range used did not cover the periods where this occurred, as this is extremely

rare and occurs only for very short durations.

the Monte Carlo analysis, as this data was not included in the model used. 13

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Figure 7: Comparison of effect of different processing scenarios on the final concentration in the powder a) current dosing practice b) effect of the implementation of ingredient dosing ratio control to the evaporator flow rate on the ingredient concentration c) effect of the implementation of ingredient dosing ratio control to the evaporator flow rate with a constant tank volume.

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Figure 8: Fish bone diagram showing the different aspects of the process that were assessed systematically for performance during off-specification events.

Due to the two-tank dosing system, a fresh tank has to be made up prior to the dosing tank

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running dry, preferably with sufficient time for adequate mixing. However if the fresh solution is

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not made up in time, then dosing is suspended until fresh solution becomes available. This was

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found to have occurred on days when below-specification results were detected roughly during

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the sampling time period.

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The other common cause found was due to the management of the milk powder storage

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hoppers. Given that not all powder is fortified and large hoppers are used when packing powder

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for transport, if a small amount of unfortified powder remains at the bottom of the storage

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hoppers when a new, fortified specification powder is packed on top, then this will to be picked

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up as a below-specification result during testing. During these occurrences the hopper level was

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not quite zero, and although the quantity remaining was tiny in reference to the total amount of

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powder produced, it is more than sufficient to be easily picked up during sampling.

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These causes were not picked up on for a number of reasons that need to be considered when carrying out any fault diagnosis:

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1. Neither flow stoppages, nor the mixing of fortified and unfortified powder were hypothesised as possible causes for the rare below-specification results. It was assumed that the system operated always as intended, and thus these possibilities were not investigated. In retrospect all possibilities should be eliminated using supporting data.

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2. The concentration is measured with a significant delay. This lack of immediate feedback

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means that possible causes are easily overlooked or forgotten amongst the other information

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needed to run a complex plant. This means that the fault search space needs to look beyond

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pre-conceived ideas.

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3.6. Recommended Operational Changes Both the Monte Carlo approach and the case-by-case analysis resulted in distinct recommendations being suggested for addressing the system performance.

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The Monte Carlo analysis showed that correcting the ratio control gain of the dosing flow

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rate, preferably to the mass of solids passing through the dryer, would reduced the variation

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of the ingredient in the milk powder. Furthermore, the dilution of the ingredient in the dosing

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tank should also be accounted for, whether through better control of the fill volume, or through

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adjustment of the dosing rate based on the actual dilution. The consequences of these can be

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easily economically quantified. The MC analysis could also quantify the relative importance of

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decreasing processing variance as opposed to decreasing the variance of the incoming material

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streams.

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The unexpected below-specification results can be eliminated by giving operators adequate

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warning when the dosing tank is going to run empty to prevent dosing stoppages, and by ensuring

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that unfortified and fortified powders do not get mixed inadvertently during packing. This could

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be programmed as a warning into the human machine interface (HMI), or another plant systems.

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4. Conclusions

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This work looked at the fault diagnosis of a specific issue at a large, complex industrial milk

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powder plant. Two strategies were employed to investigate why a fortification ingredient showed

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a large variation in the final milk powder and unexpected below-specification results: a broad

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Monte Carlo analysis, supplemented by a case-by-case study. This resulted in a wider framing

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of the problem, and such a dual-pronged approach is necessary when it is likely that more than

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one issue is actually active at any one time.

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In this industrial case study, it was found that the large variation came from normal processing

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which was quantified by the MC analysis, and the below-specification results came from simple

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causes such as flow stoppages and inadvertent mixing of fortified and unfortified milk powder.

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Both issues have been addressed with specific process changes to work towards real-time quality.

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In general, the fault diagnosis followed a number of different hypothesised causes, and we

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found that all had to be reconciled for any recommendations to be adopted at the plant. A

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single tool is unlikely to be completely successful given that at any one time on a complex 16

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industrial plant, the high probability of multiple seemingly independent, possibly simple, issues.

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However simple problems in complex environments are not so simple to diagnose due to the

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interconnections, noise and amount of data that has to be processed in a large system. Hence

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the suggestion to use a two-step approach consisting of using statistical models to reduce the

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search space, after which one can then undertake a more detailed, directed efficient case-by-case

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study.

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5. Acknowledgements

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The authors would like to acknowledge the Primary Growth Partnership program from the

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New Zealand Ministry of Primary Industries for funding the project and would also like to thank

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Fonterra staff, specifically James Winchester, Richard Croy, Hong Chen, Brian Woods, Steve

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Holroyd, Nigel Russell and Tristan Hunter for providing resources and support throughout the

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project.

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Significant variation in fortified milk powder quality Large, complex industrial powder plant made issues difficult to track Monte Carlo analysis used to understand the processing sources of the large quality variation Case-by-case analysis used for off-spec events guided by Monte Carlo results Fault diagnosis required to ensure all causes were found to produce consistent quality powder

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