Download
1 / 17
170 likes | 330 Views
Using Dynamic Flexibility Analysis to Integrate Design and Control under Uncertainty. AIChE 2005 Annual Meeting Cincinnati, OH October 30-November 4 Paper 496b Session 10C10: Design & Operation under Uncertainty Andr é s Malcolm, Libin Zhang and Andreas A. Linninger 11/03/2005
E N D
Using Dynamic Flexibility Analysis to Integrate Design and Control under Uncertainty AIChE 2005 Annual Meeting Cincinnati, OH October 30-November 4 Paper 496b Session 10C10: Design & Operation under Uncertainty Andrés Malcolm, Libin Zhang and Andreas A. Linninger 11/03/2005 Laboratory for Product and Process Design, Department of Chemical Engineering, University of Illinois, Chicago, IL 60607, U.S.A.
Arbitrary overdesign Flexible process? Model Optimize Control Integrated Design & Control Simultaneous Design and control optimization Model Exact Metrics of Flexibility Classical Design Approach • MODEL: • Make Steady State Model of the Process • DESIGN OPTIMIZATION: • Nominal operating conditions and specifications • Optimization and validation • DESIGN FLEXIBILITY • Empirical overdesign to accommodate uncertainty • DYNAMICS and OPERABILITY • Controller design to accommodate disturbances and uncertainty Arbitrary overdesign Flexible process? Model Optimize Control
Trade-off between design and control Total Cost (Capital + Operating) Design Decisions Control Complexity Optimal minimum cost integrated design and control
Overview Obtain a minimum expected cost design (d) Ensure Flexibility • Level 1- Dynamic Modeling, Flexibility Concepts and Structural Decisions • Level 2- Design Optimization
1)Initiation 2)Propagation 3)Termination Integrated Design and Control of a Polymerization Reactor • Polymerization Reactor (Ogunnaike, AIChE J. 1999) Relationship of product quality and total annualized cost under varying and uncertain process conditions
Level-1: Identification of Structural Decisions • Product Quality target: D1/D0 • Change on target change on set-point • Change on set-point change on operating conditions • Need to change design variables to accommodate production needs • NEED to integrate design and control • Design variables, controls, and uncertainty sources • Design: Reactor Volume , Monomer Concentration, Control Parameters • Control: Coolant Flow and Initiator Flow • Uncertainty Sources: Coolant Inlet Temperature, Heat Transfer Coef. (U) • Kinetic Parameters (k, E)
Level-2: Integrated Design and Control Design Initial d, c Sample Uncertain Space θNEW, ξNEW(t) θ, ξ(t) Min Expected Cost Optimal Design d, c Min Cost Design Not Flexible Rigorous Dynamic Flexibility Test Update Critical Scenarios Min Cost Flexible Design Flexible Optimal d, c
Dynamic uncertainty Tcool time P() Time-Invariant uncertainty U q2 time q1 Level-2: Uncertainty Modeling Scenario sampling: by LHS techniques Simple method to compute expected performance
Minimize Total Expected Cost Conservational Laws Control Algorithm Process and Product Constraints Level-2: Optimal Expected Design and Control • Stochastic dynamic optimization • Defined over the finite sample set • Optimizes design and control decisions for minimum expected cost
Minimize Total Expected Cost Conservational Laws Control Algorithm Process and Product Constraints Level-2: Optimal Expected Design and Control Minimum Expected Cost Design V=0.23 m3 Cmi=4.52 mol/l Kc=0.0042 Tsp=295.2 K Psp=24,950
UUCL quality UCL SP LCL LLCL Time Integrated Design and Control Results Optimal Design V=0.28 m3 Cmi=5.02 mol/l Kc=0.0052 Tsp=296 K Psp=24,950 • The optimal design proposes a small reactor • Smaller reactors are more sensitive to input uncertainty • Smaller resident time leads to a faster control • Bigger overshoots but for shorter times
Exploring the Control Dimension: MIMO sys. MIMO System P+I Control IMC Control Total Cost (Capital + Operating) RTDA Control DMC Control NMPC Control Design Decision (Reactor Volume) 0.05 m3 0.1 m3 .15 m3 • Trade-off between design and control decisions • MIMO systems with high value product complex control schemes are identified to be optimal • Why not always use the most sophisticated control scheme?
Exploring the Control Dimension: SISO sys. SISO System NMPC Control DMC Control Total Cost (Capital + Operating) P+I Control IMC Control RTDA Control Design Decision (Condenser Area) 30 m2 40 m2 50 m2 • SISO systems with low value product: simpler control schemes are identified to be optimal • Complex control scheme capital investment not justified • Each system has it optimal combination of design and control
Conclusions • The NMPC and a small batch reactor rendered the optimally integrated design solution under dynamic uncertainty and disturbance scenarios • Simultaneous design and control identifies best trade off between design and control options • Tradeoff between D&C decisions for an industrial batch polymerization process were quantified. • Systematic decision hierarchy for integrated D&C was applied successfully to process of industrial complexity
Open Questions - Future Work • Recent advancement in robust large scale stochastic dynamic optimization algorithms are expected to enhance the benefits of integrated design and control (e.g MIDO embedded in g-proms)
Acknowledgements • Environmental Manufacturing Management (EvMM) fellowship from the UIC Institute for Environmental Science and Policy. • National Science Foundation Grant DMI-0328134.
