Noether's theorem [7] has been extensively initiated for the derivation of conservation laws based on the symmetries in the Lagrangian or the Hamiltonian structures. However, without using the structures (which may fail to exist), Caviglia [1, 3] determined the new operative procedure for the laws via the application of
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...
This paper expounds the relations between continuous symmetries and conserved quantities, i.e. Noeth...
The definitions of symmetries and conservation laws for autonomous (i.e. without external forces) Ha...
Noether theorem [8] concerning with symmetries of the action integral or its generalization (Bessel-...
Noether theorem (Noether [11]) concerning with symmetries of the action integral or its generalizati...
AbstractTwo formulas are introduced to directly obtain new conservation laws for any system of parti...
Conservation laws play an important role in science. The aim of this thesis is to provide an overvie...
For deriving conserved quantities (first integrals) of given differential system in particle dynamic...
In this Letter a first-order Lagrangian for the Schrödinger–Newton equations is derived by modifying...
communicated by A. Laforgia Abstract. We discuss the phase-space of conservation laws in Lagrangian ...
Abstract: We focus on classical mechanical systems with a finite number of degrees of freedom and ma...
We review the Lagrangian formulation of (generalised) Noether symmetries in the framework of Calculu...
In the invariant variational principle, most of the conservation laws are derived from the Lagrangia...
The interplay between symmetries, conservation laws, and variational principles is a rich and varied...
AbstractA general theorem on conservation laws for arbitrary differential equations is proved. The t...
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...
This paper expounds the relations between continuous symmetries and conserved quantities, i.e. Noeth...
The definitions of symmetries and conservation laws for autonomous (i.e. without external forces) Ha...
Noether theorem [8] concerning with symmetries of the action integral or its generalization (Bessel-...
Noether theorem (Noether [11]) concerning with symmetries of the action integral or its generalizati...
AbstractTwo formulas are introduced to directly obtain new conservation laws for any system of parti...
Conservation laws play an important role in science. The aim of this thesis is to provide an overvie...
For deriving conserved quantities (first integrals) of given differential system in particle dynamic...
In this Letter a first-order Lagrangian for the Schrödinger–Newton equations is derived by modifying...
communicated by A. Laforgia Abstract. We discuss the phase-space of conservation laws in Lagrangian ...
Abstract: We focus on classical mechanical systems with a finite number of degrees of freedom and ma...
We review the Lagrangian formulation of (generalised) Noether symmetries in the framework of Calculu...
In the invariant variational principle, most of the conservation laws are derived from the Lagrangia...
The interplay between symmetries, conservation laws, and variational principles is a rich and varied...
AbstractA general theorem on conservation laws for arbitrary differential equations is proved. The t...
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...
This paper expounds the relations between continuous symmetries and conserved quantities, i.e. Noeth...
The definitions of symmetries and conservation laws for autonomous (i.e. without external forces) Ha...