Title of article
On backward product of stochastic matrices
Author/Authors
Touri، نويسنده , , Behrouz and Nedi?، نويسنده , , Angelia، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
12
From page
1477
To page
1488
Abstract
We study the ergodicity of backward product of stochastic and doubly stochastic matrices by introducing the concept of absolute infinite flow property. We show that this property is necessary for ergodicity of any chain of stochastic matrices, by defining and exploring the properties of a rotational transformation for a stochastic chain. Then, we establish that the absolute infinite flow property is equivalent to ergodicity for doubly stochastic chains. Furthermore, we develop a rate of convergence result for ergodic doubly stochastic chains. We also investigate the limiting behavior of a doubly stochastic chain and show that the product of doubly stochastic matrices is convergent up to a permutation sequence. Finally, we apply the results to provide a necessary and sufficient condition for the absolute asymptotic stability of a discrete linear inclusion driven by doubly stochastic matrices.
Keywords
Discrete inclusion systems , distributed control , Averaging control , Product of stochastic matrices , Switching control , Doubly stochastic matrices , Ergodicity , Absolute infinite flow property
Journal title
Automatica
Serial Year
2012
Journal title
Automatica
Record number
1448746
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