On dynamics of the Mapping class group action on relative PSL(2,R)-Character Varieties

Abstract

In this paper, we study the mapping class group action on the relative PSL(2,R)-character varieties of punctured surfaces. It is well known that Minsky's primitive-stable representations form a domain of discontinuity for the Out(Fn)-action on the PSL(2,C)-character variety. We define simple-stability of representations of fundamental group of a surface into PSL(2,R) which is an analogue of the definition of primitive stability and prove that these representations form a domain of discontinuity for the MCG-action. Our first main result shows that holonomies of hyperbolic cone surfaces are simple-stable. We also prove that holonomies of hyperbolic cone surfaces with exactly one cone-point of cone-angle less than π are primitive-stable, thus giving examples of an infinite family of indiscrete primitive-stable representations.

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