Cubic Maps as Models of Two Dimensional Antimonotonicity

SILVINA PONCE DAWSON; CELSO GREBOGI

CHAOS, SOLITONS AND FRACTALS

Año: 1991 vol. 1 p. 137 - 144

0960-0779

Families of dissipative two-dimensional diffeomorphisms that satisfy certain regularity conditions have been proved to be antimonotone [Kan et al., preprint (1990)], i.e. there are infinitely many periodic orbits created and infinitely many destroyed near certain parameter values of the system. We show that, in general, this sequence of creation and destruction of periodic orbits can also be modeled by families of one-dimensional maps with at least two critical points.