Asymptotical stability analysis of linear fractional differential systems 被引量：4

Asymptotical stability analysis of linear fractional differential systems

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摘要 It has been recently found that many models were established with the aid of fractional derivatives, such as viscoelastic systems, colored noise, electrode-electrolyte polarization, dielectric polarization, boundary layer effects in ducts, electromagnetic waves, quantitative finance, quantum evolution of complex systems, and fractional kinetics. In this paper, the asymptotical stability of higher-dimensional linear fractional differential systems with the Riemann-Liouville fractional order and Caputo fractional order were studied. The asymptotical stability theorems were also derived. It has been recently found that many models were established with the aid of fractional derivatives, such as viscoelastic systems, colored noise, electrode-electrolyte polarization, dielectric polarization, boundary layer effects in ducts, electromagnetic waves, quantitative finance, quantum evolution of complex systems, and fractional kinetics. In this paper, the asymptotical stability of higher-dimensional linear fractional differential systems with the Riemann-Liouville fractional order and Caputo fractional order were studied. The asymptotical stability theorems were also derived.

作者李常品赵振刚

机构地区 Department of Mathematics

出处《Journal of Shanghai University(English Edition)》 CAS 2009年第3期197-206,共10页 上海大学学报（英文版）

关键词 fractional differential system Mittag-Leffler function asymptotical stability fractional differential system, Mittag-Leffler function, asymptotical stability

分类号 TP11 [自动化与计算机技术—控制理论与控制工程]

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