Abstract:
A method of designing the operations and controls of a aircraft gas turbine engine includes generating an operations model for the gas turbine include at least one objective function, defining operations and control constraints for the operations model of the gas turbine, and providing an online dynamic optimizer/controller that dynamically optimizes and controls operation of the gas turbine using model predictive control based on the operations model and the operations and control constraints using an Extended Kalman Filter for estimation.

Description:
BACKGROUND OF THE INVENTION  
         [0001]    This invention relates generally to aircraft engine power management schemes and more particularly, to methods and apparatus for nonlinear model predictive control of an aircraft gas turbine.  
           [0002]    Gas turbines are used in different environments, such as, for example, but not limited to, providing propulsion as aircraft engines and for power generation in both land based power systems and sea borne power systems. The gas turbine model considered is a low bypass, two rotor, turbojet with a variable exhaust area that would be used in military aircraft applications. During normal operation this turbine experiences large changes in ambient temperature, pressure, Mach number, and power output level. For each of these variations the engine dynamics change in a significant nonlinear manner. Careful attention is typically paid by the controller during engine operation to ensure that the mechanical, aerodynamic, thermal, and flow limitations of the turbo machinery is maintained. In addition, the control authority is restricted by the actuator rate and saturation limits. Current technology solves this nonlinear constrained problem using many SISO linear controllers in concert that are gain scheduled and min/max selected to protect against engine limits. While the existing methods have many merits, there exists a need to solve the problem using nonlinear model predictive control (NMPC), which handles the nonlinearities and constraints explicitly and in a single control formulation.  
         BRIEF DESCRIPTION OF THE INVENTION  
         [0003]    In one aspect, a method of designing the operations and controls of an aircraft gas turbine engine is provided. The method includes generating an operations model for the gas turbine, generating at least one objective function, defining operations and control constraints for the operations model of the gas turbine, and providing an online dynamic optimizer/controller that dynamically optimizes and controls operation of the gas turbine using model predictive control based on the operations model and the operations and control constraints using an Extended Kalman Filter for estimation.  
           [0004]    In another aspect, a system for designing the operations and controls of an aircraft gas turbine engine is provided. The system includes a computing unit with an input unit for generating an operations model for the aircraft gas turbine engine, generating at least one objective function and for defining operations and controls constraints for the operations model of the aircraft gas turbine engine, and a dynamic online optimizer/controller configured to dynamically optimize and control operation of the gas turbine using model predictive control based on the operations model and the operations and control constraints using an Extended Kalman Filter for estimation.  
           [0005]    In yet another aspect, a non-linear model-based control method for controlling propulsion in a aircraft gas turbine engine is provided. The method includes a) obtaining information about the current state of the engine using an Extended Kalman Filter, b) updating model data information about the engine in an model-based control system to reflect the current state of the engine, c) determining the optimal corrective action to take given the current state of the engine, the objective function, and the constraints of the engine, d) outputting a control command to implement the optimal corrective action, and e) repeating steps a)-d) as necessary to ensure the performance of the engine is optimized at all times. 
       
    
    
     BRIEF DESCRIPTION OF THE DRAWINGS  
       [0006]    [0006]FIG. 1 illustrates a schematic of a layout of an engine.  
         [0007]    [0007]FIG. 2 illustrates a comparison of SRTM and CLM for PCN 2  and PS 3 .  
         [0008]    [0008]FIG. 3 illustrates an implementation of NMPC based on the constrained open-loop optimization of a finite horizon objective function.  
         [0009]    [0009]FIG. 4 illustrates a block diagram representation of how EKF, SRTM, NMPC, and CLM are connected. 
     
    
     DETAILED DESCRIPTION OF THE INVENTION  
       [0010]    First is discussed the gas turbine or plant and how it is modeled. Then a simplified model is introduced that will be used inside the control and the state estimator. In the following section a novel NMPC formulation is presented.  
         [0011]    GLOSSARY  
         [0012]    CLM—Component Level Model  
         [0013]    EKF—Extended Kalman Filter  
         [0014]    NMPC—Nonlinear Model Predictive Control  
         [0015]    SRTM—Simplified Real Time Model  
         [0016]    MODEL VARIABLES  
         [0017]    Actuation Inputs  
         [0018]    A 8 DMD—Exhaust Nozzle Area Demand  
         [0019]    WFDMD—Fuel Flow Demand  
         [0020]    Output Variables  
         [0021]    FNAV—Thrust  
         [0022]    N 2 —Fan Speed  
         [0023]    N 25 —Core Speed  
         [0024]    P 2 —Fan Inlet Pressure  
         [0025]    PCN 2 —Percent Fan Speed  
         [0026]    PCN 25 —Percent Core Speed  
         [0027]    PP—Engine Pressure Ratio  
         [0028]    PS 3 —Compressor Discharge Static Pressure  
         [0029]    SM 25 —Core Stall Margin  
         [0030]    T 4 B—High Pressure Turbine Exit Temperature  
         [0031]    Operational Parameters  
         [0032]    ALT—Altitude  
         [0033]    DTAMB—Ambient Temperature Deviation  
         [0034]    XM—Mach Number  
         [0035]    [0035]FIG. 1 illustrates a schematic of a layout of an engine  10  as well as the station designations, sensors, and actuators for engine  10 . Engine  10  is an aerodynamically coupled, dual rotor machine wherein a low-pressure rotor system (fan and low-pressure turbine) is mechanically independent of a high-pressure (core engine) system. Air entering the inlet is compressed by the fan and then split into two concentric streams. One of these then enters the high-pressure compressor and proceeds through the main engine combustor, high-pressure turbine, and low-pressure turbine. The other is directed through an annular duct and then recombined with the core flow, downstream of the low-pressure turbine, by means of a convoluted chute device. The combined streams then enter the augmenter to a convergent-divergent, variable area exhaust nozzle where the flow is pressurized, expands, and accelerated rearward into the atmosphere, thus generating thrust.  
         [0036]    The plant model is a physics based component level model (CLM) of this turbine configuration, which was developed by GE Aircraft Engines. This model is very detailed, high-fidelity, and models each component starting at the inlet, through the fan, compressor, combustor, turbines, and exhaust nozzle. Since NMPC is a model based control, an internal model is used to predict the future responses of the plant to control inputs. As the CLM is a very large and complicated model, a new model was developed to be used in the NMPC that has a small number of states, executes quickly, can be analytically linearized, and is accurate to within 20 percent transiently and 5 percent steady state over the area of the flight envelope that is most used.  
         [0037]    The SRTM has two control inputs, fuel flow demand (WFDMD), and exhaust nozzle area demand (A 8 DMD), as well as ambient condition inputs; altitude (ALT), Mach (XM), and ambient temperature deviation from ISO (DTAMB). The outputs from the SRTM is all of the outputs currently used in the production control plus any other parameters such as stall margin and thrust that can be used in future studies and form the basis of the constrained operation. The outputs are, percent core speed (PCN 25 ), percent fan speed (PCN 2 ), fan inlet pressure (P 2 ), fan total exit pressure (P 14 ), fan static exit pressure (PS 14 ), compressor inlet pressure (P 25 ), engine pressure ratio (PP), compressor discharge static pressure (PS 3 ), compressor discharge total pressure (P 3 ), fan airflow (W 2 R), compressor airflow (W 25 R), fan inlet temperature (T 2 ), compressor inlet temperature (T 25 ), high pressure turbine exit temperature (T 4 B), fan stall margin (SM 2 ), core stall margin (SM 25 ), and thrust (FNAV).  
         [0038]    A simplified real-time model (SRTM) of an aircraft engine along with the main fuel metering valve (MFMV) and variable exhaust nozzle (A 8 ) actuators is developed that meets the above specifications. The model is designed to replicate both transient and steady state performance. The inertias of both rotors are considered in the SRTM because they are the main factors affecting the engine transient performance. Other states include P 3  which represents something similar to combustor volume, T 42  which approximates the bulk flame dynamics, two states that represent fuel actuator dynamics, and 1 state that represents the A 8  actuator dynamics. The model is data driven and is designed to use the steady state relationships/data from either a complex non-linear model, or from real engine data, and then fit parameters to transient data that account for the dynamics between the inputs and the other model states.  
         [0039]    The SRTM considers the low pressure and high pressure rotor speeds as the main energy storage components, or the states of the model. These speeds can change state if an unbalanced torque is applied. Simply put, the speed increments of the engine are the integral of the surplus torques. This is stated mathematically as  
                    ω          t       =       1   I            ∑     i   =   1     N                     Q   i                 Equation                 1                               
 
         [0040]    Where  
            ω          t                           
 
         [0041]    is the rotor angular acceleration, N is the number of unbalanced torques, I is the rotor inertia, and Q i  is the ith torque. The torques arise from any mismatches to the steady state relationships. For example, for a given PCN 2  there is a steady state fuel flow. If the actual fuel flow is greater than the steady state relationship from PCN 2  then a positive unbalanced torque will increase PCN 2  dot. PCN 2  dot can be similarly acted upon by the other rotor PCN 25 . The same logic is used on the PCN 25  rotor. The other engine dynamic elements of the SRTM including T 42  and PS 3  act in a similar way to the rotors.  
         [0042]    Also included in the SRTM are the inner loop and actuator dynamics for fuel flow and A 8 . In this part of the model there is a delay that is associated with computational delays, actuator delay, and transport delay of the fuel to the combustor. There is a gain that accounts for the change from commanded position to fuel flow. The actuator dynamics are modeled as 2nd order with rate and position limits. The A 8  actuator is similar but is only 1st order actuator dynamics. Except for the FMV gain, all of the other parameters for this part of the model are found using nonlinear system identification.  
         [0043]    The other outputs from the model specified above are generated from table lookups based on the dynamic element outputs. For validation the SRTM is run open loop versus the CLM. The inputs profiles for the validation are a large step increase in fuel at 2 sec., small step decrease in fuel at 4 sec., small step increase in A 8  at 6 sec., and a large step decrease in A 8  at 8 sec. The results of one such comparison are shown in FIG. 2 for PCN 2  and PS 3 . While for this comparison both parameters are within 10 percent transiently and 5 percent steady state, for all of the parameters over all tested points in the defined envelope the maximal deviation transiently is 22 percent and the maximal deviation steady state is 7 percent. These results are just outside of the requirements, but are still quite remarkable given the simplicity of the model structure.  
         [0044]    These adaptive model-based control systems and methods are designed to reduce operator workload and enable autonomous gas turbine operation by: (1) providing sufficient information to the supervisory control so that the supervisory control can manage propulsion, power and/or electrical output for the given mission or event; (2) elevating the level of autonomy in the engine control; (3) aiding the integration of the engine control with the supervisory control; and/or (4) improving engine-related decision-making capabilities.  
         [0045]    Many model-based control systems are created by designing a model of each component and/or system that is to be controlled. For example, there may be a model of each engine component and system—compressor, turbine, combustor, etc. Each model comprises features or dynamic characteristics about the component&#39;s or system&#39;s behavior over time (i.e., speed accelerations being the integral of the applied torques). From the model(s), the system may control, estimate, correct or identify output data based on the modeled information. For example, if thrust or power is lost because an actuator is stuck in a specific position, the system can hold the control to that actuator fixed as an input constraint, and then adapt the controls that are output to the other actuators so that no other constraints are violated, and as much lost thrust power as possible can be regained so that the gas turbine may can continue operation.  
         [0046]    The models in the model-based controls are designed to replicate both transient and steady state performance. The models can be used in their non-linear form or they can be linearized or parameterized for different operating conditions. Model-based control techniques take advantage of the model to gain access to unmeasured engine parameters in addition to the normal sensed parameters. These unmeasured parameters may include thrust, stall margins, and airflows. These controls can be multiple-input multiple-output (MIMO) to account for interactions of the control loops, they are model-based to get rid of the scheduling, and they have limits or constraints built as an integral part of the control formulation and optimization to get rid of designing controllers for each limit. The current strategy for this invention involves trying to collapse the controller into an objective function(s) and constraint(s) that is used as part of a finite horizon constrained optimization problem.  
         [0047]    The herein described methods allow either performance or operability to be optimized. If the performance-optimizing mode is selected, the objectives include attempting to maximize, minimize or track thrust, power, electricity, specific fuel consumption, part life, stress, temperatures, pressures, ratios of pressures, speed, actuator command(s), flow(s), dollars, costs, etc. This leads to longer engine run times, fuel savings, increased transient performance, increased parts life, and/or lower costs. If the operability-optimizing mode is selected, the objectives include attempting to manage stall margin, increase operability, and prevent in-flight mishaps. This leads to reduction of loss of thrust or loss of power control events, increased engine operating time in presence of faults, failures, or damage and increased engine survivability.  
         [0048]    The herein described model-based control systems and methods that comprise a system model, estimators, and model-based control or model-predictive control. Physics-based and empirical models provide analytical redundancy of sensed engine parameters and access to unmeasured parameters for control and diagnostics purposes as well as provide prediction of future behavior of the system. Estimators associated with the various models will ensure that the models are providing accurate representations of the engine and its subsystems and components as well as estimate the model state. Nonlinear model predictive control maintains robust, high-performance control of the engine in the presence of system faults and mission segment-specific operational goals, using the predictive capabilities of model and information from the model-based diagnostics.  
         [0049]    Because each engine is different, deteriorates, and may become faulted or damaged, the model should be able to track or adapt itself to follow these changes. One helpful idea is to get a model to reveal information about the particular engine running at the current time. This facilitates the ability to predict more accurately future behavior and to detect smaller faults or damage levels. Two areas of the model that can be modified to match the engine model to the current engine are engine parameters and states. The tool used to determine the engine parameters is called a parameter estimator, and the tool used to determine the states is a state estimator.  
         [0050]    A parameter estimator estimates and modifies parameters in the engine model in order to reduce the error between the engine sensors and the model sensors, or this is called tracking the model to the engine. The parameters that are modified usually fall in the class called quality parameters, e.g. component efficiencies, flow, input or output scalars or adders. These quality parameters like component efficiencies can then be used as inputs to the diagnostic algorithms. For example, if the compressor efficiency drops by a couple of points during steady state operation, it may indicate damage has occurred in the compressor. In this realization the parameter estimator works in real-time on both transient information and steady state information.  
         [0051]    A state estimator is used to also aid in tracking and is the state information is also used to initialize the model-based control at each time interval. Since the model-based control is a full state controller, it will use the estimate of the current state of the engine to initialize and function correctly. The goal of the state estimator is to determine the optimum gain K to account for the differences between the model and the engine, given the model dynamics and the covariance of w and v.  
         [0052]    [0052]FIG. 3 illustrates an implementation of NMPC based on the constrained open-loop optimization of a finite horizon objective function. This optimization uses a plant model to describe the evolution of the outputs and commences from an assumed known initial state. FIG. 3 illustrates the concept of receding horizon control underpinning NMPC. At time k the input variables, {u(k), u(k+1), . . . , u(k+p−1)}, are selected to optimize a performance criterion over the prediction horizon, p. Of the computed optimal control moves, only the values for the first sample, u(k), are actually implemented. Before the next time interval and its calculation of another p input values, {u(k+1), u(k+2), . . . , u(k+p)}, the initial state is re-estimated from output measurements. This causes the seemingly open-loop strategy actually to implement a closed-loop control.  
         [0053]    The NMPC and the EKF state estimator are both model-based procedures in which a model of the plant is calculated for the generation of state predictions. There is a clear hierarchy of models in this specific problem, the real plant, whose dynamics are not fully known, the CLM, which is a high-fidelity but computationally complex model which is difficult to linearize, and the SRTM, which is linearizeable and relatively simply iterated as part of the optimization procedure.  
         [0054]    In an empirical study implementing the herein described methods, the controlled inputs are fuel flow demand (WFDMD) and exhaust area demand (A 8 DMD). Since the control is model based it can be designed to follow the unmeasured but estimated or computed parameters of interest such as thrust and stall margin, but this studies first goal is to perform to the same requirements as the production control already running an engine. For engine  10  the references are fan speed (ref 1 ) and engine pressure ratio (ref 2 ). While operating to these two references, the control is constrained by other operating limitations, such as, for example, maximum T 4 B, minimum and maximum PS 3 , minimum and maximum N 25 , maximum N 2 , rotor speed acceleration, and rotor speed deceleration. Also, both actuators are rate limited and have minimum and maximum slew positions. The formulation of NMPC used to work within this framework is now detailed.  
         [0055]    An objective function J is defined over the prediction horizon p.  
                   J   =         ∑     i   =   1     p                       (       PCN                 2        R   i       -     ref                   1   i         )     2       +     γ   *       ∑     i   =   1     p                       (       PP   i     -     ref                   2   i         )     2         +                                  ρ   1     *       ∑     i   =   1     p                     Δ                   Wf   i   2           +       ρ   2            ∑     i   =   1     p          Δ                 A                   8   i   2           +                                  δ   1            ∑     i   =   1     p            (          (       Ps                   3   i       -     Ps                   3   max         )       )     2         +       δ   2            ∑     i   =   1     p            (          (       PCN                   2   i       -     PCN                   2   max         )       )     2         +                                  δ   3              *   ∑       i   =   1     p            (          (       T4B   i     -     T4B   max       )       )     2         +       δ   4            ∑     i   =   1     p            (          (       PCN                   25   i       -     PCN                   25   max         )       )     2         +   ⋯                   (   2   )                               
 
         [0056]    Where γ, ρ, and δ are weighting factors. The SRTM is used as the predictor to obtain the turbine cycle parameters&#39; response over the prediction horizon. The constraints on cycle parameters like PS 3  and T 4 B are included as soft constraints or penalty functions. This is implemented by using an exponential term that is very small, i.e. little effect on J, when operating away from the constraint, but penalizes J heavily when the parameter comes near the constraint. The AWf and AA 8  terms are added to both to make sure that the control does not attempt to take unfeasibly large steps, and also they are set to be just outside of the range of the actual input constraints to make sure that the gradient follows a direction that will correspond with the final solution.  
         [0057]    A generic objective function J is defined over the prediction horizon p.  
                   J   =         ∑     i   =   1     p                       (       Y1   i     -     Y1ref   i       )     2       +     γ   *       ∑     i   =   1     p                       (       Y2   i     -     Y2ref   i       )     2         +                                  ρ   1     *       ∑     i   =   1     p                     Δ                 U                   1   i   2           +       ρ   2            ∑     i   =   1     p          Δ                 U                   2   i   2           +                                  δ   1            ∑     i   =   1     p            (          (       Out                   1   min       -     Out                   1   i         )       )     2         +       δ   2            ∑     i   =   1     p            (          (       Out                   2   i       -     Out                   2   max         )       )     2         +   …                   (   3   )                               
 
         [0058]    Where γ, ρ, and δ are weighting factors, min and max represent minimum and maximum constraints. The tracking of references (Y 1 , Y 2 , . . . ) can be any state or output parameter. The number of tracked references can be less than or equal to the number of actuator inputs U. The number of actuators in this formulation is not limited. The constraints on cycle parameters or states like Out 1 , Out 2 , . . . are included as soft constraints or penalty functions. This is implemented by using an exponential term that is very small, i.e. little effect on J, when operating away from the constraint, but penalizes J heavily when the parameter comes near the constraint. The number of constraints is not limited. The ΔU 1  and ΔU 2  terms are added to both to make sure that the control does not attempt to take unfeasibly large steps, and also they are set to be just outside of the range of the actual input constraints to make sure that the gradient follows a direction that will correspond with the final solution.  
         [0059]    The control goal is  
               min   u          J   .             (   4   )                               
 
         [0060]    Where u is the vector of p future WFCMD and A 8 CMD control inputs. This is accomplished using a gradient descent method with central differences. The gradient computation is shown in eq. (5).  
               ∇   J     =           J        (     u   +   du     )       -     J        (     u   -   du     )           2      du       =                  ∂   J       ∂     wfdmd   t                 ∂   J       ∂     A8dmd   t                 ⋮       ⋮               ∂   J       ∂     wfdmd     t   +   c                   ∂   J       ∂     A8dmd     t   +   c                   0       0           ⋮       ⋮             0     t   +   p             0     t   +   p                            (   5   )                               
 
         [0061]    The control inputs are then computed by taking n steps in the negative gradient direction until J is minimized, or the maximum number of iterations or search time is reached. Projection of the inputs is applied at this time to ensure that the actuator rate and position limits are not violated. The control values are calculated using  
           u ( k+ 1)= u ( k )−β*∇ J   (6)  
         [0062]    Where β is a weighting matrix that accounts for gradient step size and weighting between the two control inputs.  
         [0063]    NMPC is a full state feedback controller and hence all states need to be measured or estimated from available measurements. Typically not all states are measured because of the cost or availability of sensors. Moreover sensors have dynamics, delays, and noise. Hence a dynamic observer is useful to reconstruct the states and reduce noise. An Extended Kalman Filter (EKF) is used for this purpose. Useful EKF&#39;s are described in Athans, M. (1996), The Control Handbook, pg. 589-594, CRC Press, United States, and B. D. O. Anderson and J. B. Moore, Optimal Filtering, Prentice-Hall, Englewood Cliffs N.J., 1979.  
         [0064]    The EKF is a nonlinear state estimator which is based on a dynamical system model. While the model underpinning the EKF is nonlinear, the recursion is based on a linear gain computed from the parameters of the linearized model. Thus the design concepts inherit much from the realm of Kalman Filtering. In the instant implementation, the SRTM is used as the core of the EKF, which is a parallel with its use in the NMPC.  
         [0065]    Akin to the gradient-based NMPC, the EKF need not provide the truly optimal state estimate to the controller in order to operate adequately well. It is usually a suboptimal nonlinear filter in any case. However, its role in providing the state estimates to the NMPC for correct initialisation is a key feature of NMPC which is often overlooked.  
         [0066]    The EKF and SRTM are wrapped into the NMPC logic and this is connected to the CLM for simulation or to the real engine. FIG. 4 illustrates a block diagram representation of how EKF, SRTM, NMPC, and CLM or engine are connected. The assembled control process starts with the EKF using the SRTM to determine the current state of the engine. This information is used as the initial conditions for the predictions used in the gradient calculation. The SRTM is then run 2*c times where 2 is the number of control inputs and c the control horizon used is 15 steps. The sample time is dependant upon the application, but is 10 mseconds for each time step in this application. Each run corresponds to a perturbation at a different point in the control horizon. This information is assembled into the gradient and a search path is followed in the negative gradient direction.  
         [0067]    While NMPC can recreate the current production control, using this technology may unlock many potential benefits. Using the model based properties of NMPC can lead to running to other more attractive references like thrust and stall margin.  
         [0068]    While the invention has been described in terms of various specific embodiments, those skilled in the art will recognize that the invention can be practiced with modification within the spirit and scope of the claims.