We investigate the different large $N$ phases of a generalized Gross-Witten-Wadia $U(N)$ matrix model. The deformation mimics the one-loop determinant of fermion matter with a particular coupling to gauge fields. In one version of the model, the GWW phase transition is smoothed out and it becomes a crossover. In another version, the phase transition occurs along a critical line in the two-dimensional parameter space spanned by the t~Hooft coupling $lambda$ and the Veneziano parameter $tau$. We compute the expectation value of Wilson loops in both phases, showing that the transition is third-order. A calculation of the $beta $ function shows the existence of an IR stable fixed point.
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