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A positroid is an ordered matroid realizable by a real matrix with all nonnegative maximal minors. Postnikov gave a map from ordered matroids to Grassmann necklaces, for which there is a unique positroid in each fiber of the map. Here, we characterize the ternary positroids and the set of matroids in their respective fibers, referred to as their positroid envelope classes. We show that a positroid is ternary if and only if it is near-regular, and that all ternary positroids are formed by direct sums and 2-sums of binary positroids and positroid whirls. We fully characterize the envelope classes of ternary positroids; in particular, the envelope class of a positroid whirl of rank-r contains exactly four matroids.
Quail et al. (Mon,) studied this question.