DocumentCode
3179249
Title
Verification of equilibrium point stability for linearization of an aircraft model
Author
Ahsan, Muhammad ; Rafique, Hamza ; Ahmed, Waseem
Author_Institution
Nat. Univ. of Sci. & Technol., Islamabad, Pakistan
fYear
2013
fDate
19-20 Dec. 2013
Firstpage
1
Lastpage
6
Abstract
Unmanned Air Vehicles (UAVs) are of vital importance in future aviation industry. A UAV is flown by an onboard controller which controls aircraft movements during flight. For convenient design of linear controllers, a stable operating point (equilibrium point) is required against which the aircraft model can be linearized. This paper aims at developing a technique for stability verification of such an operating point. For a nonlinear mathematical model of a UAV, its equilibrium point has been determined using an optimization scheme. The non-linear model is then linearized using Jacobian based numerical linearization technique. Due to insignificant values of coupling terms, the aircraft linear model is decoupled into longitudinal and lateral sub-models. The response of nonlinear model is compared to that of linearized sub-models by applying identical inputs to the both model types. Simulation results for both the cases are presented. It is concluded that this work presents a convenient technique to verify the stability of equilibrium point, leading to successful controller design.
Keywords
aerospace control; aerospace industry; autonomous aerial vehicles; control system synthesis; linear systems; optimisation; stability; Jacobian based numerical linearization; UAV; aircraft linear model; aircraft model; aircraft movements; aviation industry; equilibrium point stability verification; flight control; lateral submodels; linear controllers; linearized submodels; nonlinear mathematical model; onboard controller design; optimization; stable operating point; unmanned air vehicles; Aerodynamics; Aircraft; Atmospheric modeling; Computational modeling; Equations; Mathematical model; Stability analysis; Equilibrium point; Flight controller; Linearization; Stability; UAV;
fLanguage
English
Publisher
ieee
Conference_Titel
Multi Topic Conference (INMIC), 2013 16th International
Conference_Location
Lahore
Type
conf
DOI
10.1109/INMIC.2013.6731315
Filename
6731315
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