I will survey known results and discuss a recent work with Alisa Knizel on a two-parameter family of random lozenge tilings of the hexagon related to the q-Racah orthogonal polynomials. Namely, these polynomials power the determinantal correlation kernel of the tilings. The model is a generalization of the uniform and q-weighted random tilings and displays new interesting behavior compared to the former. Of particular interest is the so-called waterfall region, where two-dimensional pure states collapse into one dimension.
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