Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's: On the Direct Lefschetz Stability Criterion for a System of Nonhomogeneous Linear Ode's with Variable Coefficients - Softcover
Synopsis
In most studies of stability, asymptotic stability appears to be the most common approach. This is because asymptotic stability implies stability; however, the reverse is not true. In most cases it is easier to confirm asymptotic stability than stability. The method whereby stability is studied without asymptotic stability is referred to as a direct stability method. We have chosen the Lefschetz direct stability method; modified it to suit our problem at hand. The direct method requires the construction of a Lyapunov function; not easy for a non-dynamic problem. For a dynamic problem the energy thereof is a suitable candidate for a Lyapunov function. For a non-dynamic problem it is harder to construct a Lyapunov function as there are no rules for the purpose. In this presentation we modify the Lefschetz system for the direct stability method and apply it to study the stability of a system of linear first order ODEs with variable coefficients.
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About the Author
Paul Sunnyboy Makhabane holds a Master of Science degree in Applied Mathematics from the University of Venda in South Africa. He is a lecturer in the Department of mathematics and Applied mathematics at the University of Limpopo. His research interests include ordinary differential equations, partial differential equations and viscosity solutions.
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode s
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Condition: New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. Autor/Autorin: Makhabane Paul SunnyboyPaul Sunnyboy Makhabane holds a Master of Science degree in Applied Mathematics from the University of Venda in South Africa. He is a lecturer in the Department of mathematics and Applied mathematics at the Uni. Seller Inventory # 5155018
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's : On the Direct Lefschetz Stability Criterion for a System of Nonhomogeneous Linear Ode's with Variable Coefficients
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LAP Lambert Academic Publishing, 2014
ISBN 10: 3659418358
ISBN 13: 9783659418358
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Taschenbuch. Condition: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - In most studies of stability, asymptotic stability appears to be the most common approach. This is because asymptotic stability implies stability; however, the reverse is not true. In most cases it is easier to confirm asymptotic stability than stability. The method whereby stability is studied without asymptotic stability is referred to as a direct stability method. We have chosen the Lefschetz direct stability method; modified it to suit our problem at hand. The direct method requires the construction of a Lyapunov function; not easy for a non-dynamic problem. For a dynamic problem the energy thereof is a suitable candidate for a Lyapunov function. For a non-dynamic problem it is harder to construct a Lyapunov function as there are no rules for the purpose. In this presentation we modify the Lefschetz system for the direct stability method and apply it to study the stability of a system of linear first order ODEs with variable coefficients. Seller Inventory # 9783659418358
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Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's | On the Direct Lefschetz Stability Criterion for a System of Nonhomogeneous Linear Ode's with Variable Coefficients
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LAP Lambert Academic Publishing, 2014
ISBN 10: 3659418358
ISBN 13: 9783659418358
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Taschenbuch. Condition: Neu. Analysis of Boundary Value Problem for a System of Nonhogeneous Ode's | On the Direct Lefschetz Stability Criterion for a System of Nonhomogeneous Linear Ode's with Variable Coefficients | Paul Sunnyboy Makhabane (u. a.) | Taschenbuch | Englisch | LAP Lambert Academic Publishing | EAN 9783659418358 | Verantwortliche Person für die EU: preigu GmbH & Co. KG, Lengericher Landstr. 19, 49078 Osnabrück, mail[at]preigu[dot]de | Anbieter: preigu. Seller Inventory # 105228113