Add to ORKGThe symmetry approach to the determination of Jacobi’s last multiplier is inverted to provide a source of additional symmetries for the Euler–Poinsot system. These additional symmetries are nonlocal. They provide the symmetries for the representation of the complete symmetry group of the system
A systematic investigation of the skew-symmetric solutions of the three-dimensional Jacobi equations...
Abstract. This paper studies relationships between the order reductions of ordinary differential equ...
AbstractThe study of the symmetry of Pais–Uhlenbeck oscillator initiated in Andrzejewski et al. (201...
The Ermakov-Pinney equation possesses three Lie point symmetries with the algebra sl(2, R). This alg...
After giving a brief account of the Jacobi last multiplier for ordinary differential equa-tions and ...
The complete symmetry group of a 1 + 1 linear evolution equation has been demon-strated to be repres...
AbstractWe use a formula derived almost seventy years ago by Madhav Rao connecting the Jacobi Last M...
this paper, I propose a new theoretical and computational basis for a nonlocal theory which, like th...
In this paper, by introduction of pseudopotentials, the nonlocal symmetry is obtained for the Ablowi...
We review the general theory of the Jacobi last multipliers in geometric terms and then apply the th...
The equation xuml+3xx center dot+x(3)=0 is well known in many areas of mathematics and physics. It p...
Open access version at https://arxiv.org/pdf/1810.04962.pdfWe discuss, in all generality, the reduct...
We present a detailed discussion of the infinit esimal symmetries of the Hamilton-Jacobi equation (a...
We study the construction of singular Lagrangians using Jacobi's last multiplier (JLM). We also demo...
Following the analysis we have presented in a previous paper (that we refer to as [I]), we describe ...
A systematic investigation of the skew-symmetric solutions of the three-dimensional Jacobi equations...
Abstract. This paper studies relationships between the order reductions of ordinary differential equ...
AbstractThe study of the symmetry of Pais–Uhlenbeck oscillator initiated in Andrzejewski et al. (201...
The Ermakov-Pinney equation possesses three Lie point symmetries with the algebra sl(2, R). This alg...
After giving a brief account of the Jacobi last multiplier for ordinary differential equa-tions and ...
The complete symmetry group of a 1 + 1 linear evolution equation has been demon-strated to be repres...
AbstractWe use a formula derived almost seventy years ago by Madhav Rao connecting the Jacobi Last M...
this paper, I propose a new theoretical and computational basis for a nonlocal theory which, like th...
In this paper, by introduction of pseudopotentials, the nonlocal symmetry is obtained for the Ablowi...
We review the general theory of the Jacobi last multipliers in geometric terms and then apply the th...
The equation xuml+3xx center dot+x(3)=0 is well known in many areas of mathematics and physics. It p...
Open access version at https://arxiv.org/pdf/1810.04962.pdfWe discuss, in all generality, the reduct...
We present a detailed discussion of the infinit esimal symmetries of the Hamilton-Jacobi equation (a...
We study the construction of singular Lagrangians using Jacobi's last multiplier (JLM). We also demo...
Following the analysis we have presented in a previous paper (that we refer to as [I]), we describe ...
A systematic investigation of the skew-symmetric solutions of the three-dimensional Jacobi equations...
Abstract. This paper studies relationships between the order reductions of ordinary differential equ...
AbstractThe study of the symmetry of Pais–Uhlenbeck oscillator initiated in Andrzejewski et al. (201...