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Reduced Bers boundaries of Teichmüller spaces

Ken’ichi Ohshika (2014)

Annales de l’institut Fourier

We consider a quotient space of the Bers boundary of Teichmüller space, which we call the reduced Bers boundary, by collapsing each quasi-conformal deformation space lying there into a point.This boundary turns out to be independent of the basepoint, and the action of the mapping class group extends continuously to this boundary.This is an affirmative answer to Thurston’s conjecture.He also conjectured that this boundary is homeomorphic to the unmeasured lamination space by the correspondence coming...

Regular and limit sets for holomorphic correspondences

S. Bullett, C. Penrose (2001)

Fundamenta Mathematicae

Holomorphic correspondences are multivalued maps $f = Q ̃ ₊ Q ̃ ₋^{- 1} : Z \to W$ between Riemann surfaces Z and W, where Q̃₋ and Q̃₊ are (single-valued) holomorphic maps from another Riemann surface X onto Z and W respectively. When Z = W one can iterate f forwards, backwards or globally (allowing arbitrarily many changes of direction from forwards to backwards and vice versa). Iterated holomorphic correspondences on the Riemann sphere display many of the features of the dynamics of Kleinian groups and rational maps, of which...

Displaying 1 – 5 of 5

Reduced Bers boundaries of Teichmüller spaces

Regular and limit sets for holomorphic correspondences

Remarks on points of approximation of discrete sugroups of U(1,n; C).

Rigidity and inflexibility in conformal dynamics.

Rigidity of cusps in deformations of hyperbolic 3-orbifolds.

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