AbstractThe inverse problem of Lagrangian dynamics is solved for the geodesic spray associated to the canonical symmetric linear connection on a Lie group of dimension three or less. The degree of generality is obtained in each case and concrete Lagrangians are written down
A manifold with an arbitrary affine connection is considered and the geodesic spray associated with ...
The inverse problem of Lagrangian dynamics in the multiple variational principle is to establish nec...
We prove that if a surjective submersion which is a homomorphism of Lie algebroids is given, then th...
AbstractThe inverse problem of Lagrangian dynamics is solved for the geodesic spray associated to th...
Abstract. This paper gives a comprehensive analysis of the inverse problem of Lagrangian dynamics fo...
AbstractThis article studies the inverse problem of the calculus of variations for the special case ...
In order to characterize the systems of second-order ODEs which admit a regular Lagrangian function,...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
Abstract. For an invariant Lagrangian equal to kinetic energy and defined on a semidirect product of...
In the calculus of variations, the Euler-Lagrange operator E(L) refers to the differential operator ...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
Abstract. The purpose of this paper is to describe geometrically discrete Lagrangian and Hamiltonian...
For a Riemannian structure on a semidirect product of Lie groups, the variational problems can be re...
For a Riemannian structure on a semidirect product of Lie groups, the variational problems can be re...
Euler–Lagrange equations and variational integrators are developed for Lagrangian mechanical systems...
A manifold with an arbitrary affine connection is considered and the geodesic spray associated with ...
The inverse problem of Lagrangian dynamics in the multiple variational principle is to establish nec...
We prove that if a surjective submersion which is a homomorphism of Lie algebroids is given, then th...
AbstractThe inverse problem of Lagrangian dynamics is solved for the geodesic spray associated to th...
Abstract. This paper gives a comprehensive analysis of the inverse problem of Lagrangian dynamics fo...
AbstractThis article studies the inverse problem of the calculus of variations for the special case ...
In order to characterize the systems of second-order ODEs which admit a regular Lagrangian function,...
AbstractA method for solving the inverse variational problem for differential equations admitting a ...
Abstract. For an invariant Lagrangian equal to kinetic energy and defined on a semidirect product of...
In the calculus of variations, the Euler-Lagrange operator E(L) refers to the differential operator ...
Abstract. A method for solving the inverse variational problem for di®er-ential equations admitting ...
Abstract. The purpose of this paper is to describe geometrically discrete Lagrangian and Hamiltonian...
For a Riemannian structure on a semidirect product of Lie groups, the variational problems can be re...
For a Riemannian structure on a semidirect product of Lie groups, the variational problems can be re...
Euler–Lagrange equations and variational integrators are developed for Lagrangian mechanical systems...
A manifold with an arbitrary affine connection is considered and the geodesic spray associated with ...
The inverse problem of Lagrangian dynamics in the multiple variational principle is to establish nec...
We prove that if a surjective submersion which is a homomorphism of Lie algebroids is given, then th...