The modular action on PSL(2,R)-characters in genus 2
arXiv:1309.3553 · doi:10.1215/00127094-3166522
Abstract
We explore the dynamics of the action of the mapping class group in genus 2 on the PSL(2,R)-character variety. We prove that this action is ergodic on the connected components of Euler class 1 and -1, as it was conjectured by Goldman. In the connected component of Euler class 0 there are two invariant open subsets, on one of them the action is ergodic. In this process we give a partial answer to a question of Bowditch.
43 pages, 17 figures