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Simulation Input and Output Data Analysis. Chapter 9 Business Process Modeling, Simulation and Design Augmented with material from other sources. Overview. Analysis of input data Identification of field data distributions Goodness-of-fit tests Random number generation
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Simulation Input and Output Data Analysis • Chapter 9 • Business Process Modeling, Simulation and Design • Augmented with material from other sources
Overview • Analysis of input data • Identification of field data distributions • Goodness-of-fit tests • Random number generation • Analysis of Output Data • Non-terminating v.s. terminating processes • Confidence intervals • Hypothesis testing for comparing designs
Input Data Output Data Simulation Model Random Random Why Input and Output Data Analysis? • Analysis of input data • Necessary for building a valid model • Three aspects • Identification of (time) distributions • Random number generation • Generation of random variates Integrated into Extend • Analysis of output data • Necessary for drawing correct conclusions • The reported performance measures are typically random variables!
Capturing Randomness in Input Data • Collect raw field data and use as input for the simulation • No question about relevance • Expensive/impossible to retrieve a large enough data set • Not available for new processes • Not available for multiple scenarios No sensitivity analysis • Very valuable for model validation • Generate artificial data to use as input data • Must capture the characteristics of the real data • Collect a sufficient sample of field data • Characterize the data statistically – Distribution type and parameters • Generate random artificial data mimicking the real data • High flexibility – easy to handle new scenarios • Cheap • Requires proper statistical analysis to ensure model validity
1. Gather data from the real system 2. Identify an appropriate distribution family 3. Estimate distribution parameters and pick an “exact” distribution • Informal test – “eye-balling” • Formal tests, for example • 2 - test • Kolmogorov-Smirnov test Distribution hypothesis rejected 4. Perform Goodness–of–fit test (Reject the hypothesis that the picked distribution is correct?) If a known distribution can not be accepted Use an empirical distribution Procedure for Modeling Input Data • Plot histograms of the data • Compare the histogram graphically (“eye-balling”) with shapes of well known distribution functions • How about the tails of the distribution, limited or unlimited? • How to handle negative outcomes?
Example – Modeling Interarrival Times (I) • Data gathering from the real system
Example – Modeling Interarrival Times (II) • Identify an appropriate distribution type/family • Plot a histogram • Divide the data material into appropriate intervals • Usually of equal size • Determine the event frequency for each interval (or bin) • Plot the frequency (y-axis) for each interval (x-axis) The Exponential distribution seems to be a good first guess!
Example – Modeling Interarrival Times (III) • Estimate the parameters defining the chosen distribution • In the current example Exp()has been chosen need to estimate the parameter • ti = the ith interarrival time in the collected sample of n observations
Example – Modeling Interarrival Times (III) • Perform Goodness-of-fit test • The purpose is to test the hypothesis that the data material is adequately described by the “exact” distribution chosen in steps 1-3. • Two of the most well known standardized tests are • The 2-test • Should not be applied if the sample size n<20 • The Kolmogorov-Smirnov test • A relatively simple but imprecise test • Often used for small sample sizes • The 2-test will be applied for the current example
Data: x1, x2, …, xn(n observations from the real system) Model: X1, X2,…, Xn (Random variables, independent and identically distributed with CDF F(x)) Performing a 2-Test (I) • In principle • A statistical test comparing the relative frequencies for the intervals/bins in a histogram with the theoretical probabilities of the chosen distribution • Assumptions • The distribution involves k parameters estimated from the sample • The sample contains n observations (sample size=n) • F0(x) denotes the chosen/hypothesized CDF Null hypothesis H0: F(x) = F0(x) Alternative hypothesis HA: F(x) F0(x)
Performing a 2-Test (II) f0(x) The area = p2 = F0(a2) - F0(a1) Data values … Min=a0 a1 a2 a3 ar-2 ar-1 ar=Max Bin: 2 3 r-1 r 1 • Take the entire data range and divide it into r non overlapping intervals or bins • pi = The probability that an observation X belongs to bin i • The Null Hypothesis pi = F0(ai) - F0(ai-1) • To improve the accuracy of the test • choose the bins (intervals) so that the probabilities pi (i=1,2, …r) are equal for all bins
Performing a 2-Test (III) 2. Define r random variables Oi, i=1, 2, …r • Oi=number of observations in bin i (= the interval (ai-1, ai]) • If H0 is true the expected value of Oi = n*pi • Oi is Binomially distributed with parameters n and pi 3. Define the test variable T • If H0 is true T follows a 2(r-k-1) distribution • T = The critical value of T corresponding to a significance level • obtained from a 2(r-k-1) distribution table • Tobs = The value of T computed from the data material • If Tobs > T H0 can be rejected on the significance level
Validity of the 2-Test • Depends on the sample size n and on the bin selection (the size of the intervals) • Rules of thumb • The 2-test is acceptable for ordinary significance levels (=1%, 5%) if the expected number of observations in each interval is greater than 5 (n*pi>5 for all i) • In the case of continuous data and a bin selection such that pi is equal for all bins • n20 Do not use the 2-test • 20<n 50 5-10 bins recommendable • 50<n 100 10-20 bins recommendable • n >100 n0.5 – 0.2n bins recommendable
Example – Modeling Interarrival Times (IV) • Hypothesis – the interarrival time Y is Exp(0.084) distributed H0: YExp(0.084) HA: YExp(0.084) • Bin sizes are chosen so that the probability pi is equal for all r bins and n*pi>5 for all i • Equal pi pi=1/r • n*pi>5 n/r > 5 r<n/5 • n=50 r<50/5=10 Choose for example r=8 pi=1/8 • Determining the interval limits ai, i=0,1,…8 i=1 a1=ln(1-(1/8))/(-0.084)=1.590 i=2 a2=ln(1-(2/8))/(-0.084)=3.425 i=8 a8 =ln(1-(8/8))/(-0.084)=
Example – Modeling Interarrival Times (V) • Computing the test statistic Tobs Note: oi = the actual number of observations in bin i • Determining the critical value T • If H0 is true T2(8-1-1)=2(6) • If =0.05 P(T T0.05)=1-=0.95 /2 table/ T0.05=12.60 • Rejecting the hypothesis • Tobs=39.6>12.6= T0.05 H0 is rejected on the 5% level
The Kolmogorov-Smirnov test (I) • Advantages over the chi-square test • Does not require decisions about bin ranges • Often applied for smaller sample sizes • Disadvantages • Ideally all distribution parameters should be known with certainty for the test to be valid • A modified version based on estimated parameter values exist for the Normal, Exponential and Weibull distributions • In practice often used for other distributions as well • For samples with n30 the 2-test is more reliable!
The Kolmogorov-Smirnov test (II) • Compares an empirical “relative-frequency” CDF with the theoretical CDF (F(x)) of a chosen (hypothesized) distribution • The empirical CDF = Fn(x) = (number of xix)/n • n=number of observations in the sample • xi=the value of the ith smallest observation in the sample Fn(xi)=i/n • Procedure • Order the sample data from the smallest to the largest value • Compute D+ , D– and D = max{D+ , D–} • Find the tabulated critical KS value corresponding to the sample size n and the chosen significance level, • If the critical KS value D reject the hypothesis that F(x) describes the data material’s distribution
Distribution Choice in Absence of Sample Data • Common situation especially when designing new processes • Try to draw on expert knowledge from people involved in similar tasks • When estimates of interval lengths are available • Ex. The service time ranges between 5 and 20 minutes Plausible to use a Uniform distribution with min=5 and max=20 • When estimates of the interval and most likely value exist • Ex. min=5, max=20, most likely=12 Plausible to use a Triangular distribution with those parameter values • When estimates of min=a, most likely=c, max=b and the average value=x-bar are available Use a -distribution with parameters and
Random Number Generators • Needed to create artificial input data to the simulation model • Generating truly random numbers is difficult • Computers use pseudo-random number generators based on mathematical algorithms – not truly random but good enough • A popular algorithm is the “linear congruential method” 1. Define a random seed x0 from which the sequence is started 2. The next “random” number in the sequence is obtained from the previous through the relation where a, c, and m are integers > 0
Larger m longer sequence before it starts repeating itself Example – The Linear Congruential Method • Assume that m=8, a=5, c=7 and x0=4
The Runs Test (I) • Test for detecting dependencies in a sequence of generated random numbers • A run is defined as a sequence of increasing or decreasing numbers • “+” indictes an increasing run • “–” indicates a decreasing run Ex. Numbers: 1, 7, 8, 6, 5, 3, 4, 10, 12, 15 runs: + + – – – + + + + + • The test is based on comparing the number of runs in a true random sequence with the number of runs in the observed sequence
The Runs Test (II) • Hypothesis: H0: Sequence of numbers is independent HA: Sequence of numbers is not independent • R = # runs in a truly random sequence of n numbers (random variable) • Have been shown that… R=(2n-1)/3 R=(16n-29)/90 RN(R, R) Test statistic: Z={(R-R)/R}N(0,1) • Assuming: confidence level and a two sided test • P(-Z/2ZZ/2)=1- • H0 is rejected if Zobserved> Z/2
Generating Random Variates • Assume random numbers, r, from a Uniform (0, 1) distribution are available • Random numbers from any distribution can be obtained by applying the “inverse transformation technique” The inverse Transformation Technique • Generate a U[0, 1] distributed random number r • T is a random variable with a CDF FT(t) from which we would like to obtain a sequence of random numbers • Note: 0 FT(t) 1 for all values of t • t is a random number from the distribution of T, i.e., a realization of T
Analysis of Simulation Output Data • The output data collected from a simulation model are realizations of stochastic variables • Results from random input data and random processing times Statistical analysis is required to • Estimate performance characteristics • Mean, variance, confidence intervals etc. for output variables • Compare performance characteristics for different designs • The validity of the statistical analysis and the design conclusions are contingent on a careful sampling approach • Sample sizes – run length and number of runs. • Inclusion or exclusion of “warm-up” periods? • One long simulation run or several shorter ones?
Non-Terminating Processes • Does not end naturally within a particular time horizon • Ex. Inventory systems • Usually reach steady state after an initial transient period • Assumes that the input data is stationary • To study the steady state behavior it is vital to determine the duration of the transient period • Examine line plots of the output variables • To reduce the duration of the transient (=“warm-up) period • Initialize the process with appropriate average values
Illustration Transient and Steady state Line plot of cycle times and average cycle time Transient state Steady state
Terminating Processes • Ends after a predetermined time span • Typically the system starts from an empty state and ends in an empty state • Ex. A grocery store, a construction project, … • Terminating processes may or may not reach steady state • Usually the transient period is of great interest for these processes • Output data usually obtained from multiple independent simulation runs • The length of a run is determined by the natural termination of the process • Each run need a different stream of random numbers • The initial state of each run is typically the same
Confidence Intervals and Point Estimates • Statistical estimation of measures from a data material are typically done in two ways • Point estimates (single values) • Confidence intervals (intervals) • The confidence level • Indicates the probability of not finding the true value within the interval (Type I error) • Chosen by the analyst/manager • Determinants of confidence interval width • The chosen confidence level • Lower wider confidence interval • The sample size and the standard deviation () • Larger sample smaller standard deviation narrower interval
Important Point Estimates • In simulation the most commonly used statistics are the mean and standard deviation () • From a sample of n observations • Point estimate of the mean: • Point estimate of :
Confidence Interval for Population Means (I) • Characteristics of the point estimate for the population mean • Xi = Random variable representing the value of the ith observation in a sample of size n, (i=1, 2, …, n) • Assume that all observations Xi are independent random variables • The population mean = E[Xi]= • The population standard deviation=(Var[Xi])0.5= • Point estimate of the population mean= • Mean and Std. Dev. of the point estimate for the population mean
Confidence Interval for Population Means (II) • Distribution of the point estimate for population means • For any distribution of Xi (i=1, 2, …n), when n is large (n30), due to the Central Limit Theorem • If all Xi (i=1, 2, …n) are normally distributed, for any n • A standard transformation: • Defining a symmetric two sided confidence interval • P(Z/2 Z Z/2) = 1 • is known Z/2 can be found from a N(0, 1) probability table • Confidence interval for the population mean
In practice when n is large (30) the t-distribution is often approximated with the Normal distribution! Confidence Interval for Population Means (III) • In case the population standard deviation, , is known • In case is unknown we need to estimate it • Use the point estimate s • The test variable Z is no longer Normally distributed, it follows a Students-t distribution with n-1 degrees of freedom
Determining an Appropriate Sample Size • A common problem in simulation • How many runs and how long should they be? • Depends on the variability of the sought output variables • If a symmetric confidence interval of width 2d is desired for a mean performance measure • If x-bar is normally distributed • If is unknown and estimated with s
Hypothesis Testing (I) • Testing if a population mean () is equal to, larger than or smaller than a given value • Suppose that in a sample of n observations the point estimate of =
Hypothesis Testing (II) 2. Testing if two sample means are significantly different • Useful when comparing process designs • A two tail test when 1=2=s • H0: 1- 2=a /typically a=0/ HA: 1- 2a • The test statistic Z belongs to a Student-t distribution • Reject H0 on the significance level if it is not true that
Hypothesis Testing (III) • If the sample sizes are large (n1+n2-2>30) • Z is approximately N(0, 1) distributed • Reject H0 if it is not true that • In practice, when comparing designs non-overlapping 3 • intervals are often used as a criteria • H0: 1- 2>0 • HA: 1- 20 • Reject H0 if
