Bending Teichmüller spaces and character varieties

Abstract

We consider the mapping bL χ from the Fricke-Teichmüller space T into the PSL2C-character variety χ of the surface, obtained by bending Fuchsian representations along a fixed measured lamination L. We prove that this mapping is an equivariant symplectic real-analytic embedding, and, for almost all measured laminations, proper. We also show that this ``bending map'' bL T χ extends continuously almost-everywhere to the canonical inclusion map from the Thurston boundary of T into the Morgan-Shalen boundary of χ. Moreover, we ``complexify" this bending map in a geometric manner. Namely, we symplectically embed this real-analytic subvariety Im bL into the product variety χ× χ by the diagonal mapping twisted by complex conjugation. Then we construct a closed C-symplectic complex-analytic subvariety of χ× χ containing Im bL as a half-dimensional real-analytic subvariety.