Paper Info
Title
Continuous Uniform Finite Time Stabilization of Planar Controllable Systems.
Abstract
Continuous homogeneous controllers are utilized in a full state feedback setting for the uniform finite time stabilization of a perturbed double integrator in the presence of uniformly decaying piecewise continuous disturbances. Semiglobal strong C-1 Lyapunov functions are identified to establish uniform asymptotic stability of the closed-loop planar system. Uniform finite time stability is then proved by extending the homogeneity principle of discontinuous systems to the continuous case with uniformly decaying piecewise continuous nonhomogeneous disturbances. A finite upper bound on the settling time is also computed. The results extend the existing literature on homogeneity and finite time stability by both presenting uniform finite time stabilization and dealing with a broader class of nonhomogeneous disturbances for planar controllable systems while also proposing a new class of homogeneous continuous controllers.
Year
DOI
Venue
2015
10.1137/120877155
SIAM JOURNAL ON CONTROL AND OPTIMIZATION
Keywords
Field
DocType
uniform finite time stability,Lyapunov functions,homogeneity
Lyapunov function,Mathematical optimization,Double integrator,Uniform limit theorem,Upper and lower bounds,Settling time,Full state feedback,Mathematical analysis,Exponential stability,Mathematics,Piecewise
Journal
Volume
Issue
ISSN
53
3
0363-0129
Citations 
PageRank 
References 
5
0.47
12
Authors
3
Name
Order
Citations
PageRank
Harshal B. Oza1195.83
Yury Orlov252052.75
sarah k spurgeon372471.21