DocumentCode
336599
Title
The construction of a universally observable flow on the torus
Author
DeStefano, Alisa ; Hall, G.R.
Author_Institution
Dept. of Math., Coll. of the Holy Cross, Worcester, MA, USA
Volume
3
fYear
1998
fDate
1998
Firstpage
2461
Abstract
We give a description of the construction of a class of dynamical systems on a two-dimensional torus which are universally observable, i.e., systems which are observable by every continuous nonconstant real-valued function on the torus. We are motivated by the work of McMahon (1987) who proved that a class of three-dimensional manifolds with horocycle flow have this property. We examine this example and are able to give sufficient conditions for a flow to be universally observable and then construct a flow on the torus which satisfies these conditions. The proofs involve techniques and concepts from topological dynamics, dynamical systems on the torus and number theory
Keywords
dynamics; multidimensional systems; observability; topology; 2D systems; dynamical systems; horocycle flow; manifolds; observability; observable flow; sufficient conditions; topological dynamics; torus; Artificial intelligence; Mathematics; Observability; Orbits; Sufficient conditions;
fLanguage
English
Publisher
ieee
Conference_Titel
Decision and Control, 1998. Proceedings of the 37th IEEE Conference on
Conference_Location
Tampa, FL
ISSN
0191-2216
Print_ISBN
0-7803-4394-8
Type
conf
DOI
10.1109/CDC.1998.757789
Filename
757789
Link To Document