We study the unique information function UI(T:X∖Y) defined by Bertschinger et al. [4] within the framework of information decompositions. In particular, we study uniqueness and support of the solutions to the convex optimization problem underlying the definition of UI. We identify sufficient conditions for non-uniqueness of solutions with full support in terms of conditional independence constraints and in terms of the cardinalities of T, X and Y. Our results are based on a reformulation of the first order conditions on the objective function as rank constraints on a matrix of conditional probabilities. These results help to speed up the computation of UI(T:X∖Y), most notably when T is binary. Optima in the relative interior of the optimization domain are solutions of linear equations if T is binary. In the all binary case, we obtain a complete picture of where the optimizing probability distributions lie.