Forcing among exact patterns of triods

Abstract

We obtain a complete characterization of topologically exact patterns on triods. Based on their rotation number , these exact patterns are grouped into three classes: slow ( < 13), fast ( > 13) and ternary ( = 13). For each category, we derive a linear ordering of the set of natural numbers, N that captures forcing between the patterns. We also show that each of these orderings is stable under perturbations.

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