مرکز منطقه ای اطلاع رساني علوم و فناوري - Some properties of the Riemannian distance function and the position vector X, with applications to the construction of Lyapunov functions

DocumentCode :

2572174

Title :

Some properties of the Riemannian distance function and the position vector X, with applications to the construction of Lyapunov functions

Author :

Pait, Felipe ; Colón, Diego

Author_Institution :

Lab. de Automacao e Controle-PTC, Univ. de Sao Paulo, São Paulo, Brazil

fYear :

2010

fDate :

15-17 Dec. 2010

Firstpage :

6277

Lastpage :

6280

Abstract :

The quadratic distance function on a Riemannian manifold can be expressed in terms of the position vector, which in turn can be constructed using geodesic normal coordinates through consideration of the exponential map. The formulas for the derivative of the distance are useful to study Lyapunov stability of dynamical systems, and to build cost functions for optimal control and estimation.

Keywords :

Lyapunov methods; optimal control; stability; Lyapunov functions; Lyapunov stability; Riemannian distance function; Riemannian manifold; dynamical systems; exponential map; geodesic normal coordinates; optimal control; optimal estimation; position vector; quadratic distance function; Geometry; Lyapunov method; Manifolds; Measurement; Stability analysis; Tensile stress; Vectors; Lyapunov functions; Riemannian geometry; geodesic distance;

fLanguage :

English

Publisher :

ieee

Conference_Titel :

Decision and Control (CDC), 2010 49th IEEE Conference on

Conference_Location :

Atlanta, GA

ISSN :

0743-1546

Print_ISBN :

978-1-4244-7745-6

Type :

conf

DOI :

10.1109/CDC.2010.5717398

Filename :

5717398

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=2572174