For certain classes of holomorphic correspondences which are matings between Kleinian groups and polynomials, we prove the existence of pinching deformations, analogous to Maskit’s deformations of Kleinian groups which pinch loxodromic elements to parabolic elements. We apply our results to establish the existence of matings between quadratic maps and the modular group, for a large class of quadratic maps, and of matings between the quadratic map
z
→
z
2
z\to z^2
and circle-packing representations of the free product
C
2
∗
C
3
C_2*C_3
of cyclic groups of order
2
2
and
3
3
.