Abstract
Let T f:[0,1]→[0,1] be an expanding Lorenz map, this means T fx:=f(x)(mod 1) where f:[0,1]→[0,2] is a strictly increasing map satisfying inff ′>1. Then T f has two pieces of monotonicity. In this paper, sufficient conditions when T f is topologically mixing are provided. For the special case f(x)=βx+α with β≥23 a full characterization of parameters (β,α) leading to mixing is given. Furthermore relations between renormalizability and T f being locally eventually onto are considered, and some gaps in classical results on the dynamics of Lorenz maps are corrected.
Original language | English |
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Pages (from-to) | 712–755 |
Number of pages | 44 |
Journal | Advances in Mathematics |
Volume | 343 |
DOIs | |
Publication status | Published - 2019 |
Austrian Fields of Science 2012
- 101027 Dynamical systems
Keywords
- CLASSIFICATION
- DYNAMICS
- Expanding map
- INTRINSIC ERGODICITY
- Locally eventually onto
- Lorenz map
- PIECEWISE MONOTONIC TRANSFORMATIONS
- RENORMALIZATION
- Renormalizable map
- Topological mixing
- Topological transitivity