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Stability and Asymptotic Stability of Functional-Differential Equations

Authors:	Iserles Arieh; Terjeki Jozsef

Institution:	Department of Applied Mathematics and Theoretical Physics, University of Cambridge Cambridge Bolyai Institute, University of Szeged Hungary

Abstract:	We investigate asymptotic behaviour of solutions of the functional-differentialequation where f and g arelocally Lipschitz functions, C is a continuous matrix and thesmooth lag function ${theta}$ obeys 0 $≤$ ${theta}$ (t) $≤$ t for t $≥$ 0. We transformthe equation into a delay equation with an infinity of delaysand use a theorem of Söderlind to derive sufficient conditionsfor stability and for asymptotic stability in the case lim_t ${theta}$ (t) = ${infty}$ . The situation is qualitatively different when lim_t ${theta}$ (t) = ${theta}$ * < ${infty}$ and we outline stability conditions for thatcase by employing direct techniques.

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