Semialgebraic descriptions of three Jukes-Cantor 3-leaf network models show that pairwise intersections and set differences are full-dimensional in site-pattern probability space, so the models are neither identical nor identifiable despite algebraic indistinguishability.
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Semialgebraic Conditions for Identifying Triangles in Phylogenetic Networks
Semialgebraic descriptions of three Jukes-Cantor 3-leaf network models show that pairwise intersections and set differences are full-dimensional in site-pattern probability space, so the models are neither identical nor identifiable despite algebraic indistinguishability.