Lagrangians for spherically symmetric potentials
From MaRDI portal
Publication:4745329
DOI10.1063/1.525252zbMath0507.70022OpenAlexW2053418965WikidataQ59308041 ScholiaQ59308041MaRDI QIDQ4745329
Publication date: 1982
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.525252
Related Items
No Lagrangian? No quantization!, On the inverse problem of the discrete calculus of variations, Alternative Lagrangians for central potentials, Equivalence and s-equivalence of vector-tensor Lagrangians, Second-order equation fields and the inverse problem of Lagrangian dynamics, Quasi-bi-Hamiltonian structures of the 2-dimensional Kepler problem, Lax formalism for a family of integrable Toda-related n-particle systems, Symmetries and the explanation of conservation laws in the light of the inverse problem in Lagrangian mechanics, Quantum harmonic oscillator presented in a nonorthodox approach, Equations of motion, commutation relations and ambiguities in the Lagrangian formalism, Alternative Lagrangians for spherically symmetric potentials, On the construction of Hamiltonians, The inverse problem in the calculus of variations: new developments, Field-theory models that admit alternative Lagrangian formulations. II, On the many-time formulation of classical particle dynamics, The inverse problem in the calculus of variations and the geometry of the tangent bundle, Variational principles for nonpotential operators, To what extent do the classical equations of motion determine the quantization scheme?, Canonical quantization of so-called non-Lagrangian systems, Computer algebra solution of the inverse problem in the calculus of variations, Unnamed Item, On the gauge structure of classical mechanics, Helmholtz conditions, covariance, and invariance identities, The equivalence problem for nonconservative mechanics
Cites Work
