Title of article
Preservation of quadratic stability under various common approximate discretization methods
Author/Authors
Corless، نويسنده , , M. and Sajja، نويسنده , , S. and Shorten، نويسنده , , R.، نويسنده ,
Issue Information
ماهنامه با شماره پیاپی سال 2014
Pages
5
From page
68
To page
72
Abstract
In this paper we prove the following result. If A is a Hurwitz matrix and f is a rational function that maps the open left half of the complex plane into the open unit disc, then any Hermitian matrix P > 0 which is a Lyapunov matrix for A (that is, P A + A ∗ P < 0 ) is also a Stein matrix for f ( A ) (that is, f ( A ) ∗ P f ( A ) − P < 0 ).
this result to prove that all A-stable approximations for the matrix exponential preserve quadratic Lyapunov functions for any stable linear system. The importance of this result is that it implies that common quadratic Lyapunov functions for switched linear systems are preserved for all step sizes when discretising quadratically stable switched systems using A-stable approximations.
es are given to illustrate our results.
Keywords
Stein matrix , Quadratic stability , Lyapunov matrix , discretization , A-stability
Journal title
Systems and Control Letters
Serial Year
2014
Journal title
Systems and Control Letters
Record number
1676790
Link To Document