Jensen's Inequality and Liapunov's Direct Method

Leigh C. Becker lbecker@cbu.edu
T. A. Burton taburton@olypen.com

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Abstract

In 1940 Marachkoff introduced the annulus argument to prove the zero solution of (1) x'= f(t, x), f(t, 0) = 0, is asymptotically stable if f is bounded when x is bounded and if a positive definite Liapunov function for (1) exists with negative definite derivative. This paved the way for researchers seeking new asymptotic stability conditions for not only (1) but also for systems of functional differential equations x' = F'(t, x_t). However, Marachkoff's approach excludes unbounded F having features that actually promote asymptotic stability. This paper provides an alternative that does not require F be bounded for x_t bounded using Jensen's inequality. It is a basic introduction to stability and it provides a new avenue for stability investigations.

Keywords

Liapunov's direct method , asymptotic stability , Jensen's inequality

Leigh C. Becker Department of Mathematics. Christian Brothers University 650 E. Parkway South. Memphis, TN 38104-5581, USA.
T. A. Burton Northwest Research lnstitute 732 Caroline St. Port. Angeles, WA 98362, USA.

Pages: 67–90
Date Published: 2004-10-01
Vol. 6 No. 3 (2004): CUBO, A Mathematical Journal

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Published

2004-10-01

How to Cite

[1]

L. C. Becker and T. A. Burton, “Jensen’s Inequality and Liapunov’s Direct Method”, CUBO, vol. 6, no. 3, pp. 67–90, Oct. 2004.

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Vol. 6 No. 3 (2004): CUBO, A Mathematical Journal

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Articles

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Bapurao C. Dhage, John R. Graef, Shyam B. Dhage, Existence, stability and global attractivity results for nonlinear Riemann-Liouville fractional differential equations , CUBO, A Mathematical Journal: Vol. 25 No. 1 (2023)
Youssef N. Raffoul, Boundedness and stability in nonlinear systems of differential equations using a modified variation of parameters formula , CUBO, A Mathematical Journal: Vol. 25 No. 1 (2023)
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