Given a hyperbolic invariant set of a diffeomorphism on a surface, it is proved that, if the holonomies are sufficiently smooth, then the diffeomorphism on the hyperbolic invariant set is rigid in the sense that it is C1+ conjugate to a hyperbolic affine model

Pinto, A. A.

Rand, D. A. (David A.)

English

Warwick Research Archives Portal Repository

Anosov diﬀeomorphisms’, Topological Dynamics. An International Symposium

Equilibrium states and the ergodic theory of Axiom A diﬀeomorphisms,

Small denominators. I: On the mapping of a circle into itself’, Investijia Akad.

Rigidity of hyperbolic sets on surfaces

http://wrap.warwick.ac.uk/738/1/WRAP_Pinto_Rigidity_hyperbolic.pdf

Rigidity of hyperbolic sets on surfaces

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