Arboreal Galois groups for quadratic rational functions with colliding critical points

Let $K$ be a field, and let $f\in K(z)$ be rational function. The preimages of a point $x_0\in P^1(K)$ under iterates of $f$ have a natural tree structure. As a result, the Galois group of the resulting field extensions of $K$ naturally embed into the automorphism group of this tree. In unpublished work from 2013, Pink described a certain proper subgroup $M_{\ell}$ that this so-called arboreal Galois group $G_{\infty}$ must lie in if $f$ is quadratic and its two critical points collide at the $\ell$-th iteration. After presenting a new description of $M_{\ell}$ and a new proof of Pink's theorem, we state and prove necessary and sufficient conditions for $G_{\infty}$ to be the full group $M_{\ell}$.