Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 2021, Director: Arturo Vieiro Yanes[en] The $n$-body problem is a classical problem in celestial mechanics which attempts to describe the motion of $n$ bodies under their mutual gravitational attraction. The problem is only solvable for two masses, and not much is known for the general case of three or more bodies. This work deals with some particular solutions of the $n$-body problem. First, using its underlying Hamiltonian structure, we state the main properties of the problem, its symmetries and first integrals. Next, we study central configurations and their relation with homothetic and relative equilibria solutions. For three bodies, the ...
Abstract. The purpose of this article is two fold. First, we show how quasi-periodic solutions for t...
Abstract. A formulation of the N-body problem is presented in which mi and ri ∈ Rd are the mass and ...
Let a number, N, of particles interact classically through Newton's Laws of Motion and Newton's inve...
We introduce the $N$-body problem of mathematical celestial mechanics, and discuss its astronomical ...
The N-body problem has been studied for many centuries and is still of interest in contemporary scie...
Recently new n-body planar orbits have been discovered which are known as choreographies. These orbi...
Abstract The three-body problem deals with point objects interacting mutually through Newton's gravi...
International audienceThe study of central configurations of the Newtonian many-body problem is a ve...
Concepts of classical and quantum mechanicsCarles Simó developed the dynamic motion of orbits of thr...
In this article we study central configurations of the (n+1)-body problem. For the planar (n+1)-body...
What does it take to qualify as a “problem for the twenty-first century? ” Obviously, the topic must...
The N-body problem is the classical prototype of a Hamiltonian system with a large symmetry group an...
The N-body problem qualifies as the problem of the twenty-first century because of its fundamental i...
AbstractThis paper proves the existence of six new classes of periodic solutions to the N-body probl...
The theory of complex dynamics is usually applied to compare the global convergence properties of d...
Abstract. The purpose of this article is two fold. First, we show how quasi-periodic solutions for t...
Abstract. A formulation of the N-body problem is presented in which mi and ri ∈ Rd are the mass and ...
Let a number, N, of particles interact classically through Newton's Laws of Motion and Newton's inve...
We introduce the $N$-body problem of mathematical celestial mechanics, and discuss its astronomical ...
The N-body problem has been studied for many centuries and is still of interest in contemporary scie...
Recently new n-body planar orbits have been discovered which are known as choreographies. These orbi...
Abstract The three-body problem deals with point objects interacting mutually through Newton's gravi...
International audienceThe study of central configurations of the Newtonian many-body problem is a ve...
Concepts of classical and quantum mechanicsCarles Simó developed the dynamic motion of orbits of thr...
In this article we study central configurations of the (n+1)-body problem. For the planar (n+1)-body...
What does it take to qualify as a “problem for the twenty-first century? ” Obviously, the topic must...
The N-body problem is the classical prototype of a Hamiltonian system with a large symmetry group an...
The N-body problem qualifies as the problem of the twenty-first century because of its fundamental i...
AbstractThis paper proves the existence of six new classes of periodic solutions to the N-body probl...
The theory of complex dynamics is usually applied to compare the global convergence properties of d...
Abstract. The purpose of this article is two fold. First, we show how quasi-periodic solutions for t...
Abstract. A formulation of the N-body problem is presented in which mi and ri ∈ Rd are the mass and ...
Let a number, N, of particles interact classically through Newton's Laws of Motion and Newton's inve...