Relative Controllability of Differential-Algebraic Systems with Delay within Riemann-Liouville Fractional Derivatives

机译：Riemann-Liouville分数阶导数内具有时滞的微分代数系统的相对可控性

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The paper deals with a problem of relative controllability for linear fractional differential-algebraic systems with delay (FDAD). FDAD systems consists of fractional differential in the Riemann-Liouville sense and difference equations. We introduce the determining equation systems and their properties. By solution representations into series of their determining equation solutions we obtain effective parametric rank criteria for relative controllability.

机译：本文研究了线性分数阶时滞微分-代数系统（FDAD）的相对可控性问题。 FDAD系统由Riemann-Liouville意义上的分数微分和差分方程组成。我们介绍了确定方程系统及其性质。通过将解决方案表示分成一系列确定方程式解决方案，我们获得了相对可控性的有效参数等级标准。

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《Conference on non-integer order calculus and its applications》|2015年|183-195|共13页
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Zbigniew Zaczkiewicz;
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Fractional differential equations; determining equations; differential-algebraic systems;

机译：分数阶微分方程;确定方程式;微分代数系统;

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4. Relative Controllability of Differential-Algebraic Systems with Delay within Riemann-Liouville Fractional Derivatives [C] . Zbigniew Zaczkiewicz Conference on non-integer order calculus and its applications . 2015

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Relative Controllability of Differential-Algebraic Systems with Delay within Riemann-Liouville Fractional Derivatives

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