Infinite hierarchies of nonlinearly dependent periodic orbits
Fecha
2001Materia
Abstract
Quadratic maps are used to show explicitly that the skeleton of unstable periodic orbits underlying classical and quantum dynamics is stratified into a doubly infinite hierarchy of orbits inherited from a set of basic ‘‘seeds’’ through certain nonlinear transformations Tα(x). The hierarchy contains nonunique substructurings which arise from the different possibilities of sequencing the transformations Tα(x). The structuring of the orbital skeleton is shown to be generic for Abelian equations, i ...
Quadratic maps are used to show explicitly that the skeleton of unstable periodic orbits underlying classical and quantum dynamics is stratified into a doubly infinite hierarchy of orbits inherited from a set of basic ‘‘seeds’’ through certain nonlinear transformations Tα(x). The hierarchy contains nonunique substructurings which arise from the different possibilities of sequencing the transformations Tα(x). The structuring of the orbital skeleton is shown to be generic for Abelian equations, i.e., for all dynamical systems generated by iterating rational functions. ...
En
Physical review. E, Statistical, nonlinear, and soft matter physics. Vol. 63, no. 1 (Jan. 2001), 016216, 5 p.
Origen
Estranjero
Colecciones
-
Artículos de Periódicos (39074)Ciencias Exactas y Naturales (5943)
Este ítem está licenciado en la Creative Commons License