Paulo Brandão, Jacob Palis, Vilton Pinheiro
Published 2013-12-31, updated 2016-01-26Version 3
Since the proof, at the end of the 80's, of the finiteness of the number of attractors for $C^3$ maps of the interval having negative Schwarzian derivative, it has been generally considered that the same result could be true for maps with discontinuities. In the present paper we show that this is indeed the case.
Comments: 33 pages, 8 figures
One-dimensional maps and Poincaré metric
On the Finiteness of Attractors for piecewise $C^2$ Maps of the Interval
Arcs, balls and spheres that cannot be attractors in $\mathbb{R}^3$
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