Fractional Noether's theorem with classical and Riemann-Liouville derivatives

机译：分数阶Noether定理与古典和Riemann-Liouville导数

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We prove a Noether type symmetry theorem to fractional problems of the calculus of variations with classical and Riemann-Liouville derivatives. As result, we obtain constants of motion (in the classical sense) that are valid along the mixed classical/fractional Euler-Lagrange extremals. Both Lagrangian and Hamiltonian versions of the Noether theorem are obtained. Finally, we extend our Noether's theorem to more general problems of optimal control with classical and Riemann-Liouville derivatives.

机译：我们证明了Noether型对称定理针对经典和Riemann-Liouville派生变量的微积分的分数问题。结果，我们获得了沿混合经典/分数Euler-Lagrange极值有效的运动常数（经典意义上）。获得了Noether定理的Lagrangian和Hamilton版本。最后，我们将Noether定理扩展到具有经典和Riemann-Liouville导数的最优控制的更多一般问题。

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《IEEE Conference on Decision and Control;CDC》|2012年|p.6885- 6890|共6页
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Frederico Gastao S. F.;
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中图分类自动控制理论;自动控制理论;
关键词
Educational institutions; Equations; Fractional calculus; Integral equations; Optimal control; Euler-Lagrange equations; Noether#039; s theorem; calculus of variations; fractional derivatives; invariance; optimal control;

机译：教育机构;方程;分数阶微积分;积分方程;最优控制; Euler-Lagrange方程; Noether定理;变异微积分;分数导数;不变性;最优控制;

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7. Fractional Noether's Theorem with Classical and Riemann-Liouville Derivatives [O] . Frederico, Gastao S. F., Torres, Delfim F. M. 2012

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Fractional Noether's theorem with classical and Riemann-Liouville derivatives

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