Detail publikace
Implicit Riccati equations and quadratic functionals for discrete symplectic systems
HILSCHER, R. RŮŽIČKOVÁ, V.
Anglický název
Implicit Riccati equations and quadratic functionals for discrete symplectic systems
Typ
Článek recenzovaný mimo WoS a Scopus
Jazyk
en
Originální abstrakt
In this paper we study discrete (implicit) Riccati matrix equations associated with discrete symplectic systems and related quadratic functionals F with variable endpoints. We derive these Riccati equations for nonnegative functionals F with separable and jointly varying endpoints. The result for jointly varying endpoints is in terms of the nonaugmented Riccati operator. The method also allows to simplify implicit Riccati equations known for the positivity of F. Finally, we establish a comparison result (Riccati inequality) for solutions of Riccati equations associated with two discrete symplectic systems.
Klíčová slova anglicky
Discrete symplectic system, Quadratic functional, Nonnegativity, Positivity, Riccati inequality, Riccati equation, Conjoined basis, Sturmian theorem
Vydáno
2006-11-15
Nakladatel
Research India Publications
ISSN
0973-6069
Časopis
International Journal of Difference Equations
Ročník
1
Číslo
1
Strany od–do
135–154
Počet stran
20
BIBTEX
@article{BUT43694,
author="Roman Šimon {Hilscher} and Viera {Štoudková Růžičková}",
title="Implicit Riccati equations and quadratic functionals for discrete symplectic systems",
journal="International Journal of Difference Equations",
year="2006",
volume="1",
number="1",
pages="135--154",
issn="0973-6069"
}