- Home
- →
- Producció científica
- →
- Articles
- →
- Ciències Matemàtiques i Informàtica
- →
- View Item
JavaScript is disabled for your browser. Some features of this site may not work without it.
Quartic Rigid Systems in the Plane and in the Poincaré Sphere
Álvarez, M.J.; Bravo, J.L.; Calderón, L.A.
Abstract:
[eng] We consider the planar family of rigid systems of the form x′ = −y + x P(x, y), y′ = x + y P(x, y), where P is any polynomial with monomials of degree one and three. This is the simplest non-trivial family of rigid systems with no rotatory parameters. The family can be compactified to the Poincaré sphere such that the vector field along the equator is not identically null . We study the centers, singular points and limit cycles of that family on the plane and on the sphere.
Files in this item
