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Abstract
Let and
be disjoint closed subintervals of [0,1] and let
be a
map such that
is a diffeomorphism onto [0,1] and
on its domain. The repeller K of F is a Cantor set. If F satisfies the bounded distortion property (BD), then K has Hausdorff dimension t smaller than 1 and its t-dimensional Hausdorff measure is finite and positive. Another related property is the strong bounded distortion (SBD), which is needed to define the scaling function of repellers associated with
maps. In this note, we give an example that shows that SBD is indeed stronger than BD.
Acknowledgements
We thank the anonymous referee for her/his valuable comments and suggestions. I. Garcia is partially supported by CAI+D2009 No. 62-310. C.G. Moreira is partially supported by CNPq and by the Balzan Research Project of J. Palis.