Theorem on a new conservation law for the dynamics of a position-dependent mass particle
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Publication:2014472
DOI10.1007/S00707-016-1697-ZzbMATH Open1369.70040OpenAlexW2530524776MaRDI QIDQ2014472
Publication date: 25 August 2017
Published in: Acta Mechanica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00707-016-1697-z
Cites Work
- Lagrange's equations for open systems, derived via the method of fictitious particles, and written in the Lagrange description of continuum mechanics
- Dynamics of bodies with time-variable mass
- The equations of Lagrange written for a non-material volume
- The inverse problem of Lagrangian mechanics for Meshchersky's equation
- A brief note on the analytical solution of Meshchersky's equation within the inverse problem of Lagrangian mechanics
- Hamilton's principle for systems of changing mass
- Geometric theory on the dynamics of a position-dependent mass particle
- The Application of Lagrange Equations to Mechanical Systems With Mass Explicitly Dependent on Position
- Conservation Laws in Systems With Variable Mass
Related Items (3)
A new conservation theorem ⋮ Poisson brackets formulation for the dynamics of a position-dependent mass particle ⋮ Jacobi multipliers and Hamel’s formalism
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