Generalized Rank via Minimal Subposet

Abstract

Let C be a small, connected category with finite hom-sets. We show that if the embedding of a connected subcategory J is both initial and final, then the restriction of any C-module along J preserves the generalized rank-or equivalently, the multiplicity of the ``entire" interval modules for C and J. Conversely, we prove that this property characterizes initial and final embeddings when both C and J are posets satisfying certain mild constraints and the embedding is full. For C a poset under these conditions, we describe the minimal full subposet whose embedding is initial or final. This generalizes an observation made by Dey and Lesnick. We also extend a result of Kinser on the generalized rank invariant to small categories.

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