C-gluing construction and slices of quasi-Fuchsian space

Abstract

Given a pants decomposition PC = \γ1, …, γ\ on a hyperbolizable surface and a vector c = (c1, …, c) ∈ R+, we describe a plumbing construction which endows with a complex projective structure for which the associated holonomy representation is quasi-Fuchsian and for which (γi) = ci. When c 0 = (0, …, 0) this construction limits to Kra's plumbing construction. In addition, when = 1,1, the holonomy representations of these structures belong to the `linear slice' of quasi-Fuchsian space QF() defined by Komori and Parkonnen. We discuss some conjectures for these slices suggested by the pictures we created in joint work with Yamashita.