scientific article; zbMATH DE number 7430703
From MaRDI portal
Publication:5860421
zbMath1474.17039MaRDI QIDQ5860421
Publication date: 19 November 2021
Full work available at URL: https://ojs.ictp.it/jnms/index.php/jnms/article/view/90
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Lie algebras of vector fields and related (super) algebras (17B66) Lagrangian formalism and Hamiltonian formalism in mechanics of particles and systems (70S05) Euler-Poisson-Darboux equations (35Q05)
Related Items (3)
Some invariant solutions and conservation laws of a type of long-water wave system ⋮ Acceleration in quantum mechanics and electric charge quantization ⋮ Non-standard magnetohydrodynamics equations and their implications in sunspots
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Geometric approach to dynamics obtained by deformation of Lagrangians
- \(G\)-strands and peakon collisions on \(\text{Diff}(\mathbb R)\)
- Non-linear dynamics with non-standard Lagrangians
- Higher order Lagrange-Poincaré and Hamilton-Poincaré reductions
- Non-standard non-local-in-time Lagrangians in classical mechanics
- Optimal control of underactuated mechanical systems with symmetries
- General conditions for the existence of non-standard Lagrangians for dissipative dynamical systems
- Invariant higher-order variational problems
- \(G\)-strands
- The Euler-Poincaré equations and semidirect products with applications to continuum theories
- Inverse variational problem for nonstandard Lagrangians
- A generalized nonlinear oscillator from non-standard degenerate Lagrangians and its consequent Hamiltonian formalism
- Non-standard fractional Lagrangians
- Fractional oscillators from non-standard Lagrangians and time-dependent fractional exponent
- Lagrangian and Hamiltonian dynamics with imaginary time
- Euler-Poincaré Dynamics of Perfect Complex Fluids
- Lagrangian formalism for nonlinear second-order Riccati systems: One-dimensional integrability and two-dimensional superintegrability
- BOHMIAN TRAJECTORIES AND THE PATH INTEGRAL PARADIGM: COMPLEXIFIED LAGRANGIAN MECHANICS
- The analogy between spin glasses and Yang–Mills fluids
- Matrix G-strands
- Generalized fractional operators for nonstandard Lagrangians
- Standard and non-standard Lagrangians for dissipative dynamical systems with variable coefficients
- Complexified dynamical systems
This page was built for publication:
