For discovering conservation laws (constants of motion) of a given system of equations of motion, there are various procedures, for example, with the Noether's theorem (Noether [12]) or the gauge-variant conditions (Djukic and Vujanovic [3]), with the concept of equivalent systems (Currie and Saletan [2], Hojman and Harlesto
Each conservation law of a given partial differential equation is determined (up to equivalence) by ...
In this contribution we are interested in spatially one-dimensional conservation laws ut +
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...
For deriving conserved quantities (first integrals) of given differential system in particle dynamic...
We present a theoretical problem of uniform motions, i.e. motions with constant magnitude of the vel...
The gauge mechanism is a generalization of the momentum map which links conservation laws to symmetr...
A study was developed in order to build a function M invariant in time, by means of Hamiltonian's fo...
Conservation laws are a recognized tool in physical- and engineering sciences. The classical procedu...
Noether theorem (Noether [11]) concerning with symmetries of the action integral or its generalizati...
We generate conservation laws for the one dimensional nonconservative Fokker-Planck (FP) equation, a...
Noether’s Theorem yields conservation laws for a Lagrangian with a variational symmetry group. The e...
Noether theorem [8] concerning with symmetries of the action integral or its generalization (Bessel-...
AbstractWe generate conservation laws for the one dimensional nonconservative Fokker–Planck (FP) equ...
Abstract: We focus on classical mechanical systems with a finite number of degrees of freedom and ma...
Conservation laws play an important role in science. The aim of this thesis is to provide an overvie...
Each conservation law of a given partial differential equation is determined (up to equivalence) by ...
In this contribution we are interested in spatially one-dimensional conservation laws ut +
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...
For deriving conserved quantities (first integrals) of given differential system in particle dynamic...
We present a theoretical problem of uniform motions, i.e. motions with constant magnitude of the vel...
The gauge mechanism is a generalization of the momentum map which links conservation laws to symmetr...
A study was developed in order to build a function M invariant in time, by means of Hamiltonian's fo...
Conservation laws are a recognized tool in physical- and engineering sciences. The classical procedu...
Noether theorem (Noether [11]) concerning with symmetries of the action integral or its generalizati...
We generate conservation laws for the one dimensional nonconservative Fokker-Planck (FP) equation, a...
Noether’s Theorem yields conservation laws for a Lagrangian with a variational symmetry group. The e...
Noether theorem [8] concerning with symmetries of the action integral or its generalization (Bessel-...
AbstractWe generate conservation laws for the one dimensional nonconservative Fokker–Planck (FP) equ...
Abstract: We focus on classical mechanical systems with a finite number of degrees of freedom and ma...
Conservation laws play an important role in science. The aim of this thesis is to provide an overvie...
Each conservation law of a given partial differential equation is determined (up to equivalence) by ...
In this contribution we are interested in spatially one-dimensional conservation laws ut +
Noether theorem (Noether [13]) concerning with symmetries of the action integral or its generalizati...