Full cascades of simple periodic orbits on the interval

  • V. Jiménez López
  • L. Snoha

Abstract

Any continuous interval map of type greater than 2∞ is shown to have what we call a full cascade of simple periodic orbits. This is used to prove that, for maps of any types, the existence of such a full cascade is equivalent to the existence of an infinite ω-limit set. For maps of type 2∞, this is equivalent to the existence of a (period doubling) solenoid. Hence, any map of type 2∞ which is either piecewise monotone (with finite number of pieces) or continuously differentiable has both a full cascade of simple periodic orbits and a solenoid.
Published
25.12.1996
How to Cite
LópezV. J., and SnohaL. “Full Cascades of Simple Periodic Orbits on the Interval”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 48, no. 12, Dec. 1996, pp. 1628-37, https://umj.imath.kiev.ua/index.php/umj/article/view/5185.
Section
Research articles