Lagrangian and Hamiltonian Mechanics on Fractals Subset of Real-Line

Alireza Khalili Golmankhaneh; Ali Khalili Golmankhaneh; Dumitru Baleanu

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Lagrangian and Hamiltonian Mechanics on Fractals Subset of Real-Line

机译：实线分形子集的拉格朗日力学和哈密顿力学

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A discontinuous media can be described by fractal dimensions. Fractal objects has special geometric properties, which are discrete and discontinuous structure. A fractaltime diffusion equation is a model for subdiffusive. In this work, we have generalized the Hamiltonian and Lagrangian dynamics on fractal using the fractional local derivative, so one can use as a new mathematical model for the motion in the fractal media. More, Poisson bracket on fractal subset of real line is suggested.

机译：不连续的介质可以用分形维数来描述。分形物体具有特殊的几何特性，是离散和不连续的结构。分形时间扩散方程是次扩散的模型。在这项工作中，我们使用分数局部导数对分形的哈密顿动力学和拉格朗日动力学进行了概括，因此可以用作分形介质中运动的一种新的数学模型。此外，建议在实线的分形子集上使用泊松括号。

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《International Journal of Theoretical Physics: A Journal of Original Research and Reviews in Theoretical Physics and Related Mathematics, Dedicated to the Unification of Physics》 |2013年第11期|共8页
作者
Alireza Khalili Golmankhaneh; Ali Khalili Golmankhaneh; Dumitru Baleanu;
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正文语种 eng
中图分类理论物理学;
关键词
Fractal calculus; Lagrangian mechanics; Hamiltonian mechanics; Poisson bracket; Variational calculus;

机译：分形演算;拉格朗日力学;哈密顿力学;泊松括号;变分演算;

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1. Lagrangian and Hamiltonian Mechanics on Fractals Subset of Real-Line [J] . Alireza Khalili Golmankhaneh, Ali Khalili Golmankhaneh, Dumitru Baleanu International Journal of Theoretical Physics: A Journal of Original Research and Reviews in Theoretical Physics and Related Mathematics, Dedicated to the Unification of Physics . 2013,第11期

机译：实线分形子集的拉格朗日力学和哈密顿力学
2. New Derivatives on the Fractal Subset of Real-Line [J] . Alireza Khalili Golmankhaneh, Dumitru Baleanu Entropy . 2016,第2期

机译：实线分形子集的新导数
3. Hamiltonian Mechanics, Quantum Chromodynamic Lagrangian, Participatory Consciousness, Deterministic Complete State Is Just What Is Needed As The Ground For A Valid Counterfactual Conditional, Quantum Mechanics Is Non-Local, Violations Of Locality Are The [J] . K.N.P. Kumar, C.J. Prabhakara, S.K. Narasimha Murthy, Advances in Physics Theories and Applications . 2013,第2期

机译：哈密顿力学，量子色动力拉格朗日论，参与意识，确定性完全状态正是有效反事实条件的基础，量子力学是非局部的，违反局部性是
4. Extension of Lagrangian-Hamiltonian Mechanics: Umbra Poisson Bracket using Bond graphs [C] . Vikas Rastogi Simulation Multi-Conference . 2016

机译：拉格朗日 - 汉密尔顿力学的推广：使用粘合图的Umbra Poisson Bracket
5. HAMILTONIAN ONE PARAMETER GROUPS AND GENERALIZED HAMILTONIAN MECHANICS. [D] . MARSDEN, JERROLD E. 1968

机译：哈密顿一参数群和广义哈密顿力学。
6. High-throughput quantum-mechanics/molecular-mechanics (ONIOM) macromolecular crystallographic refinement with PHENIX/DivCon: the impact of mixed Hamiltonian methods on ligand and protein structure [O] . Oleg Borbulevych, Roger I. Martin, Lance M. Westerhoff -1

机译：使用PHENIX / DivCon的高通量量子力学/分子力学（ONIOM）大分子晶体学提纯：混合哈密顿方法对配体和蛋白质结构的影响
7. New Derivatives on the Fractal Subset of Real-Line [O] . Alireza Khalili Golmankhaneh, Dumitru Baleanu 2016

机译：实线分形子集的新导数
8. CONSTRAINTS IN QUANTUM MECHANICS VIA LAGRANGIANS, HAMILTONIANS, AND CANONICAL EQUATIONS OF MOTION [R] . P. Amiot, J. J. Griffin 1976

机译：通过拉格朗日，哈密顿和运动的正则方程在量子力学中的约束

Lagrangian and Hamiltonian Mechanics on Fractals Subset of Real-Line

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