On type-preserving representations of the four-punctured sphere group

Abstract

We give counterexamples to a question of Bowditch that if a non-elementary type-preserving representation :π1(g,n)→ PSL(2; R) of a punctured surface group sends every non-peripheral simple closed curve to a hyperbolic element, then must be Fuchsian. The counterexamples come from relative Euler class 1 representations of the four-punctured sphere group. We also show that the mapping class group action on each non-extremal component of the character space of type-preserving representations of the four-punctured sphere group is ergodic, which confirms a conjecture of Goldman for this case. The main tool we use is Kashaev-Penner's lengths coordinates of the decorated character spaces.