On totally hyperbolic non-Fuchsian type-preserving representations

Abstract

We identify type-preserving representations φ: π1() PSL(2,R) of the fundamental group of every punctured surface = g,p that are not Fuchsian yet send all non-peripheral simple closed curves to hyperbolic elements, which give a negative answer to a question of Bowditch. These representations have relative Euler class e(φ) = (() + 1), and their PSL(2,R)-conjugacy classes form a full-measure subset of 2p connected components of the relative character variety. We further show that, while these representations are not Fuchsian, their restrictions to certain subsurfaces of are Fuchsian.

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