Classical Noether theory with application to the linearly damped particle
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Publication:2793788
DOI10.1088/0143-0807/36/6/065022zbMath1332.70021arXiv1412.7523OpenAlexW2258456243MaRDI QIDQ2793788
Thierry Gourieux, Raphaël Leone
Publication date: 17 March 2016
Published in: European Journal of Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1412.7523
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Lagrangian dynamics by nonlocal constants of motion ⋮ Li(e)nearity ⋮ Nonlocal and nonvariational extensions of Killing-type equations ⋮ Noether’s theorem, the Rund–Trautman function, and adiabatic invariance ⋮ On the modified least action principle with dissipation
Cites Work
- Unnamed Item
- Quantization of the damped harmonic oscillator revisited
- Noether's theory in classical nonconservative mechanics
- Conservation laws of dynamical systems via d'Alembert's principle
- Integrating factors for second-order ODEs
- Lie and Noether counting theorems for one-dimensional systems
- \(\lambda \)-symmetries and Jacobi last multiplier
- Noether equations and conservation laws
- New methods of reduction for ordinary differential equations
- Interplay of symmetries, null forms, Darboux polynomials, integrating factors and Jacobi multipliers in integrable second-order differential equations
- The range of application of the lagrange formalism — I
- NOTE ON THE FORCED AND DAMPED OSCILLATOR IN QUANTUM MECHANICS
- Dissipation in Quantum Mechanics. The Harmonic Oscillator
- A group theoretical identification of integrable equations in the Liénard-type equation ẍ+f(x)ẋ+g(x)=. II. Equations having maximal Lie point symmetries
- Generalizations of Noether’s Theorem in Classical Mechanics
- Integrating factors and first integrals for ordinary differential equations
- On Dissipative Systems and Related Variational Principles
- Jacobi’s last multiplier and Lagrangians for multidimensional systems
