Recent results in robust adaptive flight control systems. (English) Zbl 1273.93048
Summary: Adaptive control has been increasingly used in flight control of late, with notable technology transitions to autonomous flight platforms such as Joint Direct Attack Munition (JDAM), X-36 Tailless Fighter Agility Research Aircraft, NASA Generic Transport Model (GTM), and Boeing Phantom Ray. Given the need to make these flight systems autonomous, the spotlight, more than ever, is firmly on adaptive control and in particular, robust adaptive control systems. In this paper, we present a few recent results in robust Adaptive Flight Control Systems (AFCS) that showcase the advantages, properties, and performance of AFCS, whose foundations were laid more than 50 years ago.
MSC:
| 93B35 | Sensitivity (robustness) |
| 93C40 | Adaptive control/observation systems |
| 93C95 | Application models in control theory |
| 93C15 | Control/observation systems governed by ordinary differential equations |
References:
| [1] | CamboneS. A., KriegK. J., PaceP., WellsL. Umanned aircraft systems road map 2005-2030, Memorandum for the secretaries of the military departments, 2005. www.fas.org/irp/program/collect/uav_roadmap2005.pdf. |
| [2] | NarendraK. S., LinY. H., ValavaniL. S. Stable adaptive controller design ‐ part II: proof of stability. IEEE Transactions on Automatic Control1980; 25:440-448. · Zbl 0467.93049 |
| [3] | NarendraK. S., AnnaswamyA. M. Robust adaptive control in the presence of bounded disturbances. IEEE Transactions on Automatic Control1986; 31:306-315. · Zbl 0588.93043 |
| [4] | IoannouP. A., SunJ.Robust Adaptive Control. Prentice Hall, 1996. · Zbl 0839.93002 |
| [5] | NarendraK. S., AnnaswamyA. M.Stable Adaptive Systems. Dover, 2005. · Zbl 1217.93081 |
| [6] | NarendraK. S., KudvaP.Stable adaptive schemes for system identification and control ‐ parts I & II. IEEE Transactions on Systems, Man and Cybernetics1972 Nov; 4:542-560. |
| [7] | KreisselmeierG., NarendraK. S.Stable model reference adaptive control in the presence of bounded disturbances. IEEE Transactions on Automatic Control1982 Dec; 27:1169-1175. · Zbl 0498.93036 |
| [8] | PometJ., PralyL.Adaptive nonlinear regulation: estimation from the Lyapunov equation. IEEE Transactions on Automatic Control1992 June; 37(6). · Zbl 0755.93071 |
| [9] | SeshagiriS., KhalilHK. Adaptive nonlinear regulation: output feedback control of nonlinear systems using rbf neural networks. Neural Networks, IEEE Transactions on2000 January; 11(1). |
| [10] | LavretskyE., GibsonT. E.Projection operator in adaptive systems, 2011. |
| [11] | HaleJ. K.Ordinary Differential Equations. Wiley-Interscience New York, 1969. · Zbl 0186.40901 |
| [12] | BellmanR. The stability of solutions of linear differential equations. Duke Math J. 1943. · Zbl 0061.18502 |
| [13] | ManitiusA., OlbrotA. Finite spectrum assignment problem for systems with delays. Automatic Control, IEEE Transactions on1979. · Zbl 0425.93029 |
| [14] | YildizY., AnnaswamyA. M., KolmanovskyI., YanakievD. Adaptive posicast controller for time‐delay systems with relative degree n* ⩽2. Automatica2010; 46:279-289. · Zbl 1205.93084 |
| [15] | DuarteM. A., NarendraK. S.Error models with parameter constraints. International Journal of Control1996; 64(6):1089-1111. · Zbl 0857.93056 |
| [16] | SlotineJ. ‐J. E., LiW.Composite adaptive control of robot manipulators. Automatica1989; 25(4):509-519. · Zbl 0696.93045 |
| [17] | DuarteM. A., RiosecoJ. S., GonzalezR. I.Control of longitudinal movement of a plane using combined model reference adaptive control. Aircraft Engineering and Aerospace Technology: An International Journal2005; 77(3):199-213. |
| [18] | DuarteM. A., NarendraK. S.Combined direct and indirect approach to adaptive control. IEEE Transactions on Automatic Control1989; 34(10):1071-1075. · Zbl 0695.93057 |
| [19] | LavretskyE. Combined / composite model reference adaptive control. IEEE Transactions on Automatic Control2009; 54(11):2692-2697. · Zbl 1367.93314 |
| [20] | SlotineJ. ‐J. E., LiW.Applied Nonlinear Control. Prentice Hall, 1995. |
| [21] | NakanishiJ., FarrellJ. A., SchaalS. Composite adaptive control with locally weighted statistical learning. Neural Networks2005; 18(1):71-90. · Zbl 1075.93048 |
| [22] | Ben‐IsraelA., GrevilleT. N. E.Generalized Inverses: Theory and Applications. Springer‐Verlag: New York, NY, 2003. · Zbl 1026.15004 |
| [23] | DydekZ. T., AnnaswamyA. M., SlotineJ. ‐J. E., LavretskyE. High performance adaptive control in the presence of time delays, American control conference, 2010. |
| [24] | GibsonT. E., AnnaswamyA. M.Adaptive control in the presence of unmodeled dynamics. 2012‐01, Active Adaptive Controls Laboratory, MIT, Cambridge, MA, 2012. |
| [25] | LavretskyE. Adaptive output feedback design using asymptotic properties of lqg/ltr controllers, Aiaa 2010-7538, 2010. |
| [26] | StevensB. L., LewisF. L.Aircraft Control and Simulation. Wiley-Interscience New York, 2003. |
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