Abstract
We present examples of hyperbolizable 3-manifolds $M$ with the following property. Let $CC(\pi_1(M))$ denote the space of convex co-compact representations of $\pi_1(M)$. We show that for every $K\geq 1$ there exists a representation $\rho$ in $\bar {CC(\pi_1(M))}$ so that every $K$-quasiconformal deformation of $\rho$ lies in the closure of every component of $CC(\pi_1(M))$. The examples $M$ were discovered by Anderson and Canary.
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