The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. ex. Some numerals are expressed as "XNUMX".
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The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. Copyrights notice
Neste artigo, fornecemos um limite da solução ARE contínua em termos de uma matriz associada às soluções de Lyapunov. Com base no novo limite do tipo matriz, também consideramos vários limites escalares e os comparamos com os limites existentes. A principal vantagem dos nossos resultados sobre os resultados existentes é que os novos limites podem sempre ser obtidos se a solução estabilizadora existir, enquanto todos os limites existentes podem não ser calculados porque requerem outras condições adicionais à condição de existência.
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Sang Woo KIM, PooGyeon PARK, "Upper Bounds of the Continuous ARE Solution" in IEICE TRANSACTIONS on Fundamentals,
vol. E83-A, no. 2, pp. 380-385, February 2000, doi: .
Abstract: In this paper, we provide a bound of the continuous ARE solution in terms of a matrix associated with Lyapunov solutions. Based on the new matrix-type bound, we also consider various scalar bounds and compare them with existing bounds. The major advantage of our results over existing results is that the new bounds can be always obtained if the stabilizing solution exists, whereas all existing bounds might not be computed because they require other conditions additional to the existence condition.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/e83-a_2_380/_p
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@ARTICLE{e83-a_2_380,
author={Sang Woo KIM, PooGyeon PARK, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={Upper Bounds of the Continuous ARE Solution},
year={2000},
volume={E83-A},
number={2},
pages={380-385},
abstract={In this paper, we provide a bound of the continuous ARE solution in terms of a matrix associated with Lyapunov solutions. Based on the new matrix-type bound, we also consider various scalar bounds and compare them with existing bounds. The major advantage of our results over existing results is that the new bounds can be always obtained if the stabilizing solution exists, whereas all existing bounds might not be computed because they require other conditions additional to the existence condition.},
keywords={},
doi={},
ISSN={},
month={February},}
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TY - JOUR
TI - Upper Bounds of the Continuous ARE Solution
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 380
EP - 385
AU - Sang Woo KIM
AU - PooGyeon PARK
PY - 2000
DO -
JO - IEICE TRANSACTIONS on Fundamentals
SN -
VL - E83-A
IS - 2
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - February 2000
AB - In this paper, we provide a bound of the continuous ARE solution in terms of a matrix associated with Lyapunov solutions. Based on the new matrix-type bound, we also consider various scalar bounds and compare them with existing bounds. The major advantage of our results over existing results is that the new bounds can be always obtained if the stabilizing solution exists, whereas all existing bounds might not be computed because they require other conditions additional to the existence condition.
ER -