The Stabilization Problem: AGAS and SRS Feedbacks

pefav - Ludovic Rifford1

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English

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The Stabilization Problem: AGAS and SRS Feedbacks Ludovic Rifford1 Institut Girard Desargues, Universite Claude Bernard, 43, Bd du 11 Novembre 1918, 69622 Villeurbanne Cedex - France, 1 The Problem Throughout this paper, M denotes a smooth manifold of dimension n. We are given a control system on M of the form, x˙ = f(x, u) := m ∑ i=1 uifi(x), (1) where f1, · · · , fm are smooth vector fields on M and where the control u = (u1, · · · , um) belongs to Bm, the closed unit ball in IRm. Throughout the paper, “smooth” means always “of class C∞”. Such a control system is said to be Globally Asymptotically Controllable at the point O ? M (abbreviated GAC in the sequel) if the following two properties are satisfied: 1. Attractivity: For each x ? M there exists a control u(·) : IR≥0 ? Bm such that the corresponding trajectory x(·;x, u(·)) of (1) tends to O as t tends to infinity. 2. Lyapunov stability: For each neighborhood V of O, there exists some neigh- borhood U ofO such that if x ? U then the control u(·) above can be chosen such that x(t;x, u(·)) ? V , ?t ≥ 0.

bm such

gac control

continuous stabilizing

lyapunov function

system

semiconcave functions

thus there

any function

Sujets

Desargues

Bernard

Lyapunov function

System

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Publié par	pefav
Publié le	01 novembre 1918
Nombre de lectures	9
Langue	English

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The Stabilization Feedbacks

1 Ludovic Riﬀord

Problem: AGAS and SRS

InstitutGirardDesargues,Universite´ClaudeBernard,43,Bddu11Novembre 1918, 69622 Villeurbanne Cedex  France,rifford@igd.univlyon1.fr

1TheProblem

Throughout this paper,Mdenotes a smooth manifold of dimensionn. We are given a control system onMof the form, m X ˙x=f(x, u) :=uifi(x),(1) i=1 wheref1,∙ ∙ ∙, fmare smooth vector ﬁelds onMand where the control

u= (u1,∙ ∙ ∙, um) m belongs toBm, the closed unit ball in IR . Throughout the paper, “smooth” ∞ means always “of classC”. Such a control system is said to beGlobally Asymptotically Controllableat the pointO∈M(abbreviated GAC in the sequel) if the following two properties are satisﬁed: 1. Attractivity: For eachx∈Mthere exists a controlu(∙) : IR≥0→Bmsuch that the corresponding trajectoryx(∙;x, u(∙)) of (1) tends toOasttends to inﬁnity. 2. Lyapunov stability: For each neighborhoodVofO, there exists some neigh borhoodUofOsuch that ifx∈ Uthen the controlu(∙) above can be chosen such thatx(t;x, u(∙))∈ V,∀t≥0.

Example 1.The control system in the plane deﬁned by

2 2 x˙ =u(x−y) y˙ =u(2xy), u∈[−1,1],

is GAC at the point (0,0). In fact, as shown in Figure 1, for (x, y)6= (0,0) in 2 2 the plane, the set{u(x−y ,2xy) :u∈[−1,1]}is a subinterval of the tangent space to the circle passing through (x, y) and (0,0) with center on theyaxis. The GAC property becomes obvious.