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PROCESS MODELLING AND MODEL ANALYSIS © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Statistical Model Calibration and Validation C12
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PROCESS MODELLING AND MODEL ANALYSIS 2 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Overview Grey box models and model calibration Data analysis and preprocessing Model parameter and structure estimation: linear-nonlinear static-dynamic Model validation
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PROCESS MODELLING AND MODEL ANALYSIS 3 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences A Systematic Modelling Procedure Problem definition Controlling factors Problem data Model construction Model solution Model verification Model calibration & validation 1 2 47 5 36
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PROCESS MODELLING AND MODEL ANALYSIS 4 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Grey-box Models Process models developed from first engineering principles (white box part) part of their parameters and/or structure unknown (black box part) are called grey-box models
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PROCESS MODELLING AND MODEL ANALYSIS 5 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Model Calibration Conceptual Problem Statement Given: grey-box model calibration data (measured data) measure of fit (loss function) Estimate: the parameter values and/or structural elements
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PROCESS MODELLING AND MODEL ANALYSIS 6 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Model Calibration Conceptual Steps of Solution Analysis of model specification Sampling of continuous time dynamic models Data analysis and preprocessing Model parameter and structure estimation Evaluation of the quality of the estimate
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PROCESS MODELLING AND MODEL ANALYSIS 7 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Sampling of Continuous Time Dynamic Models Equi-distant zero-order hold sampling Discrete time input signal: u : {u(k)=u(t k ) | k=1,2,...} output signal: y : {y(k)=y(t k ) | k=1,2,...}
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PROCESS MODELLING AND MODEL ANALYSIS 8 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Sampling of Continuous Time Dynamic Models ) Model parameters (1st order approximation ) Discrete time model equations: model parameters: = I+Ah, = Bh ( , ,C,D) Continuous time model equations: model parameters: (A,B,C,D)
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PROCESS MODELLING AND MODEL ANALYSIS 9 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Data Analysis and Preprocessing -Data Screening- gross errors outliers trends Data visualization Outlier tests Trends, steady state tests Gross error detection Check measured data for: Methods to be used include:
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PROCESS MODELLING AND MODEL ANALYSIS 10 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Data Screening - Visualization Gross errors
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PROCESS MODELLING AND MODEL ANALYSIS 11 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Data Screening - Visualization Trends and jumps
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PROCESS MODELLING AND MODEL ANALYSIS 12 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Experimental Design for Parameter Estimation Static models number of measurements test point spacing test point sequencing Dynamic models (in addition) sampling time selection excitation Pseudo Random Binary Signal (PRBS)
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PROCESS MODELLING AND MODEL ANALYSIS 13 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Model Parameter and Structure Estimation Conceptual problem statement Least Squares parameter estimation - estimation procedure - properties of the estimate - linear and nonlinear models Parameter estimation for static models Parameter estimation for dynamic models
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PROCESS MODELLING AND MODEL ANALYSIS 14 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Problem Statement of Model Parameter Estimation Given: System model: Set of measured data: Loss function: Compute: an estimate such that
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PROCESS MODELLING AND MODEL ANALYSIS 15 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Problem Statement of Model Structure Estimation Given: System model: (not parametrized) Set of measured data: Loss function: Compute: an estimate such that + “candidate structures” in
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PROCESS MODELLING AND MODEL ANALYSIS 16 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Least Squares (LS) Parameter Estimation Given: System model: linear in p, single y (M) Measured data: Loss function: Compute: an estimate such that
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PROCESS MODELLING AND MODEL ANALYSIS 17 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Properties of LS Parameter Estimation Estimation: with Gaussian measurement errors : unbiased: covariance matrix:
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PROCESS MODELLING AND MODEL ANALYSIS 18 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Assessing the Fit Residuals are independent and residual tests correlation coefficient measures
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PROCESS MODELLING AND MODEL ANALYSIS 19 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Confidence Regions and Intervals Individual confidence intervals:
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PROCESS MODELLING AND MODEL ANALYSIS 20 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences LS Parameter Estimation for Nonlinear Models Solution Transformation into linear form Solution by (numerical) optimization Properties has lost its nice properties - non-normally distributed - confidence region and confidence intervals are not symmetric - unbiased
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PROCESS MODELLING AND MODEL ANALYSIS 21 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Confidence Interval for Nonlinear Parameter Estimation Sum-of-squares as a function of a parameter
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PROCESS MODELLING AND MODEL ANALYSIS 22 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Static Models Linear in Parameters General form Examples
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PROCESS MODELLING AND MODEL ANALYSIS 23 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Identification: Model Parameter and Structure Estimation of Dynamic Models Properties of the estimation problem variables (y and x) are time dependent ordered x : present and past inputs and outputs measurement errors on both y and x Steps 1. sampling continuous time models 2. estimation
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PROCESS MODELLING AND MODEL ANALYSIS 24 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Parameter Estimation of Dynamic Models Linear in Parameters General form of the input-output model LS parameter estimation with
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PROCESS MODELLING AND MODEL ANALYSIS 25 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Parameter Estimation of Nonlinear Dynamic Models
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PROCESS MODELLING AND MODEL ANALYSIS 26 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences Statistical Model Validation via Parameter Estimation Conceptual Problem Statement Given: a calibrated model validation data (measured data) measure of fit (loss function) Question: Is the calibrated model “good enough” for the purpose? (Does it reproduce the data well?)
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PROCESS MODELLING AND MODEL ANALYSIS 27 © CAPE Centre, The University of Queensland Hungarian Academy of Sciences A Systematic Modelling Procedure Problem definition Controlling factors Problem data Model construction Model solution Model verification Model calibration & validation 1 2 47 5 36
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