Topology of the space of d-pleated surfaces

Abstract

Given a maximal geodesic lamination λ on a closed oriented surface S of genus g, the space of d-pleated surfaces with pleating locus λ is an open subset of Hom(π1(S),PGLd(C)) obtained by applying generalized bending along λ to Hitchin representations. When d=2, one recovers abstract pleated surfaces in H3. In this paper, we study the topology of the space R(λ,d) of conjugacy classes of d-pleated surfaces with pleating locus λ. Firstly, we prove that R(λ,d) is real-analytically diffeomorphic to R(d2-1)(2g-2)×(R/2πZ)(d2-1)(2g-2)× Zd, where Zd denotes the finite cyclic group of order d. Furthermore, we show that each connected component of the space of conjugacy classes in Hom(π1(S),PGLd(C)) contains exactly one component of R(λ,d).