Resonant islands without separatrix chaos
Fecha
1995Abstract
An alternative type of Hamiltonian nonlinear resonant island is analyzed. In the usual case where the resonant island is pendulumlike, chains bifurcated out of the central elliptic point undergo infinite cascades of period-doubling bifurcations as they approach the island boundary. In the present case we find that those chains undergo either period doubling or inverse saddle-node bifurcations, depending on the strength of perturbing terms. In the saddle-node case we show that just after a recon ...
An alternative type of Hamiltonian nonlinear resonant island is analyzed. In the usual case where the resonant island is pendulumlike, chains bifurcated out of the central elliptic point undergo infinite cascades of period-doubling bifurcations as they approach the island boundary. In the present case we find that those chains undergo either period doubling or inverse saddle-node bifurcations, depending on the strength of perturbing terms. In the saddle-node case we show that just after a reconnection process, external chains cross the island boundary to collapse against the bifurcated internal chains. ...
En
Physical Review. E, Statistical physics, plasmas, fluids and related interdisciplinary topics. New York. Vol. 52, no. 4A (Oct. 1995), p. 3591-3595
Origen
Estranjero
Colecciones
-
Artículos de Periódicos (39077)Ciencias Exactas y Naturales (5943)
Este ítem está licenciado en la Creative Commons License