Asymptotic behavior of the solutions of an integrodifferential system |
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| Authors: | Deh-phone Kung Hsing |
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| Affiliation: | (1) Kingston, Rhode Island, U.S.A. |
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| Abstract: | ![]()
Summary We consider the system(L):  , t ⩾ p, y(t)=f(t), t⩽0, where y is an n-vector and each Ai, B(t) are n × n matrices. System(L) generates a semigroup by means of Ttf(s)=y (t+s, f), f(s) ∈ BCl(− ∞, 0]. Under some hypotheses concerning the roots ofdet ![$$[lambda 1 - mathop Sigma limits_{i = 1}^infty A_i exp[ - lambda tau _i ] - widehat{B(lambda )}] = 0$$](/content/pk176400055626p8/10231_2006_Article_BF02416962_TeX2GIFIE2.gif) where  is the Laplace transform of B(t), the asymptotic behavior of y(t) is discussed. Two typical results are: Theorem 3.1: suppose ∥B(t)∥ ɛ L1[0, ∞),  thendet ![$$left[ {lambda I - mathop Sigma limits_{i = 1}^infty A_i exp [ - lambda tau _i ] - widehat{B(lambda )}} right] ne 0$$](/content/pk176400055626p8/10231_2006_Article_BF02416962_TeX2GIFIE5.gif) forRe λ>0 iff for every ɛ>0 there is an Mɛ>0 such that ∥Ttf∥l ⩽ ⩽ Mɛ exp [ɛt]∥f∥l for t ⩾ 0. Corollary 3.1.1: suppose ![$$mathop Sigma limits_{i = 1}^infty left| {A_i } right|exp [atau _i ]< infty $$](/content/pk176400055626p8/10231_2006_Article_BF02416962_TeX2GIFIE6.gif) exp [at]B(t) ∈ ∈ L1[0, ∞) for some a>0 anddet ![$$left[ {lambda I - mathop Sigma limits_{i = 1}^infty A_i exp [ - lambda tau _i ] - widehat{B(lambda )}} right] ne 0$$](/content/pk176400055626p8/10231_2006_Article_BF02416962_TeX2GIFIE7.gif) forRe λ>−a. Then the solution of(L) is exponentially asymptotically stable. Entrata in Redazione il 21 marzo 1975. The author is grateful to ProfessorC. Corduneanu for suggesting this problem and for many helpful discussions during the preparation of the paper. |
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