It is shown that the Lie algebra of Noether symmetries for the Lagrangian minimizing an (n-1)-area enclosing a constant n-volume in a Euclidean space is so(n)⊕sℝn and in a space of constant curvature the Lie algebra is so(n). Furthermore, if the space has one section of constant curvature of dimension n1, another of n2, and so on to nk and one of zero curvature of dimension m, with n≥∑j=1knj+m (as some of the sections may have no symmetry), then the Lie algebra of Noether symmetries is ⊕j=1kso(nj+1)⊕(so(m)⊕sℝm)
AbstractIt is shown that a Lie point symmetry of the Lane–Emden system is a Noether symmetry if and ...
In order to characterize the systems of second-order ODEs which admit a regular Lagrangian function,...
The interplay between symmetries, conservation laws, and variational principles is a rich and varied...
AbstractFor a second-order equation E(t, q, q̇, q̈) = 0 defined on a domain in the plane, Lie geomet...
Functional realizations of Lie algebras are applied to the problem of determining Lie and Noether po...
We find that within the formalism of coadjoint orbits of the infinite dimensional Lie group the Noet...
We demonstrate that so-called nonnoetherian symmetries with which a known first integral is associat...
Functional realizations of Lie algebras are applied to the problem of determining Lie and Noether po...
We establish a new version of the first Noether Theorem, according to which the (equivalence classe...
In this thesis Noether symmetries are used for the classi?cation of plane symmetric, cylin\ud drical...
summary:We study curvature homogeneous spaces or locally homogeneous spaces whose curvature tensors ...
We establish a version of Noether's first Theorem according to which the (equivalence classes of) co...
The purpose of the current article is to present a brief albeit accurate presentation of the main to...
Abstract In this paper, we have investigated Noether symmetries in Lemaitre–Tolman–Bondi (LTB) metri...
In this thesis symmetry methods have been used to solve some differential equations and to find the ...
AbstractIt is shown that a Lie point symmetry of the Lane–Emden system is a Noether symmetry if and ...
In order to characterize the systems of second-order ODEs which admit a regular Lagrangian function,...
The interplay between symmetries, conservation laws, and variational principles is a rich and varied...
AbstractFor a second-order equation E(t, q, q̇, q̈) = 0 defined on a domain in the plane, Lie geomet...
Functional realizations of Lie algebras are applied to the problem of determining Lie and Noether po...
We find that within the formalism of coadjoint orbits of the infinite dimensional Lie group the Noet...
We demonstrate that so-called nonnoetherian symmetries with which a known first integral is associat...
Functional realizations of Lie algebras are applied to the problem of determining Lie and Noether po...
We establish a new version of the first Noether Theorem, according to which the (equivalence classe...
In this thesis Noether symmetries are used for the classi?cation of plane symmetric, cylin\ud drical...
summary:We study curvature homogeneous spaces or locally homogeneous spaces whose curvature tensors ...
We establish a version of Noether's first Theorem according to which the (equivalence classes of) co...
The purpose of the current article is to present a brief albeit accurate presentation of the main to...
Abstract In this paper, we have investigated Noether symmetries in Lemaitre–Tolman–Bondi (LTB) metri...
In this thesis symmetry methods have been used to solve some differential equations and to find the ...
AbstractIt is shown that a Lie point symmetry of the Lane–Emden system is a Noether symmetry if and ...
In order to characterize the systems of second-order ODEs which admit a regular Lagrangian function,...
The interplay between symmetries, conservation laws, and variational principles is a rich and varied...