Problem 69

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Is $h: Diff ^r \to \mathbb{R}$ generically continuous for some $r$?

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Tags: 
Entropy
SmoothDyn

Comments

Submitted by Ledrappier on Mon, 11/14/2016 - 16:48

[1]: yes, for $r  =  \infty $, see [2] or related stuff for $r =1$?

References

  1. [newhouse1989continuity] Newhouse SE.  1989.  Continuity properties of entropy. Annals of Mathematics. 129:215–235.
  2. [abdenur2011nonuniform] Abdenur F, Bonatti C, Crovisier S.  2011.  Nonuniform hyperbolicity for C 1-generic diffeomorphisms. Israel Journal of Mathematics. 183:1–60.

Submitted by crovisier on Tue, 06/27/2017 - 12:23

Yes also on surfaces for any r>1 (using Katok's horseshoe theorem).

To my knowledge, the case r=1 is open.

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