All inequivalent realizations of the Galilei algebras of dimensions not greater than five are constructed using the algebraic approach proposed by Shirokov. The varieties of the deformed Galilei algebras are discussed and families of one-parametric deformations are presented in explicit form. It is also shown that a number of well-known and physically interesting equations and systems are invariant with respect to the considered Galilei algebras or their deformations
A Galilean contraction is a way to construct Galilean conformal algebras from a pair of infinite-dim...
A vector space Q is introduced such that the Galilei transformations are considered linear mappings ...
Infinite-dimensional Galilean conformal algebras can be constructed by contracting pairs of symmetry...
Deformations of the smallest Galilei algebra are constructed and deformed algebras are realized by L...
A general method to easily build global and relative operators for any number n of elementary system...
Galilean conformal algebras can be constructed by contracting a finite number of conformal algebras,...
AbstractThe conformal Galilei algebra (cga) and the exotic conformal Galilei algebra (ecga) are appl...
A generalization of the conformal Galilei algebra with Levi subalgebra isomorphic to is introduced a...
Abstract. The conformal Galilei algebra (CGA) is a non-semisimple Lie algebra labelled by two parame...
publisher[Abstract] We investigate the reducibility of highest weight Verma modules over the exotic ...
We generalize the differential representation of the operators of the Galilean algebras to include f...
AbstractWe generalize the differential representation of the operators of the Galilean algebras to i...
Abstract The six Abelian twist-deformations of l-conformal Galilei Hopf algebra are considered. The ...
In this paper, Galilean orthogonal matrices in G(5) and G(1)(5) are obtained with the help of unit q...
International audienceThis article is devoted to graded algebras A having a single homogeneous relat...
A Galilean contraction is a way to construct Galilean conformal algebras from a pair of infinite-dim...
A vector space Q is introduced such that the Galilei transformations are considered linear mappings ...
Infinite-dimensional Galilean conformal algebras can be constructed by contracting pairs of symmetry...
Deformations of the smallest Galilei algebra are constructed and deformed algebras are realized by L...
A general method to easily build global and relative operators for any number n of elementary system...
Galilean conformal algebras can be constructed by contracting a finite number of conformal algebras,...
AbstractThe conformal Galilei algebra (cga) and the exotic conformal Galilei algebra (ecga) are appl...
A generalization of the conformal Galilei algebra with Levi subalgebra isomorphic to is introduced a...
Abstract. The conformal Galilei algebra (CGA) is a non-semisimple Lie algebra labelled by two parame...
publisher[Abstract] We investigate the reducibility of highest weight Verma modules over the exotic ...
We generalize the differential representation of the operators of the Galilean algebras to include f...
AbstractWe generalize the differential representation of the operators of the Galilean algebras to i...
Abstract The six Abelian twist-deformations of l-conformal Galilei Hopf algebra are considered. The ...
In this paper, Galilean orthogonal matrices in G(5) and G(1)(5) are obtained with the help of unit q...
International audienceThis article is devoted to graded algebras A having a single homogeneous relat...
A Galilean contraction is a way to construct Galilean conformal algebras from a pair of infinite-dim...
A vector space Q is introduced such that the Galilei transformations are considered linear mappings ...
Infinite-dimensional Galilean conformal algebras can be constructed by contracting pairs of symmetry...
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