Add to ORKGWe introduce a novel Hamiltonian system in n dimensions which ad-mits the maximal number 2n − 1 of functionally independent, quadratic first integrals. Moreover, we provide three different complete sets of inte-grals in involution and solve the equations of motion in closed form.
Classical (maximal) superintegrable systems in n dimensions are Hamiltonian systems with 2n - 1 inde...
In this paper, we present the integrable deformations method for a maximally superintegrable system....
Complete sets of linearly independent first integrals are found for the most general form of linear ...
We present a novel Hamiltonian system in n dimensions which admits the maximal number 2n - 1 of func...
We present a novel Hamiltonian system in n dimensions which admits the maximal number 2n - 1 of func...
A classical (or quantum) superintegrable system on an n-dimensional Rie-mannian manifold is an integ...
Abstract. A procedure to extend a superintegrable system into a new superintegrable one is systemati...
We describe a procedure to construct polynomial in the momenta first integrals of arbitrarily high d...
A classical (or quantum) superintegrable system on an n-dimensional Riemannian manifold is an integr...
Hamilton-Jacobi theory provides a powerful method for extracting the equations of motion out of some...
In this paper we present a simple, algorithmic test to establish if a Hamiltonian system is maximall...
In this paper we present a simple, algorithmic test to establish if a Hamiltonian system is maximall...
The main result of this article is that we show that from supersymmetry we can generate new superint...
Cette thèse constitue une étape dans l'étude systématique des systèmes superintégrables, tant classi...
We introduce a family of n-dimensional Hamiltonian systems which, contain, as special reductions, se...
Classical (maximal) superintegrable systems in n dimensions are Hamiltonian systems with 2n - 1 inde...
In this paper, we present the integrable deformations method for a maximally superintegrable system....
Complete sets of linearly independent first integrals are found for the most general form of linear ...
We present a novel Hamiltonian system in n dimensions which admits the maximal number 2n - 1 of func...
We present a novel Hamiltonian system in n dimensions which admits the maximal number 2n - 1 of func...
A classical (or quantum) superintegrable system on an n-dimensional Rie-mannian manifold is an integ...
Abstract. A procedure to extend a superintegrable system into a new superintegrable one is systemati...
We describe a procedure to construct polynomial in the momenta first integrals of arbitrarily high d...
A classical (or quantum) superintegrable system on an n-dimensional Riemannian manifold is an integr...
Hamilton-Jacobi theory provides a powerful method for extracting the equations of motion out of some...
In this paper we present a simple, algorithmic test to establish if a Hamiltonian system is maximall...
In this paper we present a simple, algorithmic test to establish if a Hamiltonian system is maximall...
The main result of this article is that we show that from supersymmetry we can generate new superint...
Cette thèse constitue une étape dans l'étude systématique des systèmes superintégrables, tant classi...
We introduce a family of n-dimensional Hamiltonian systems which, contain, as special reductions, se...
Classical (maximal) superintegrable systems in n dimensions are Hamiltonian systems with 2n - 1 inde...
In this paper, we present the integrable deformations method for a maximally superintegrable system....
Complete sets of linearly independent first integrals are found for the most general form of linear ...