Stabilization of the Spread-Global Dimension
Abstract
Motivated by constructions from applied topology, there has been recent interest in the homological algebra of linear representations of posets, specifically in homological algebra relative to non-standard exact structures. A prominent example of such exact structure is the spread exact structure, which is an exact structure on the category of representations of a fixed poset whose indecomposable projectives are the spread representations (that is, the indicator representations of convex and connected subsets). The spread-global dimension is known to be finite on finite posets, and unbounded on the collection of Cartesian products between two arbitrary finite total orders. It is conjectured in [AENY23] that the spread-global dimension is bounded on the collection of Cartesian products between a fixed, finite total order and an arbitrary finite total order. We give a positive answer to this conjecture, and, more generally, we prove that the spread-global dimension is bounded on the collection of Cartesian products between any fixed, finite poset and an arbitrary finite total order. In doing this, we also establish the existence of finite spread-resolutions for finitely presented representations of arbitrary upper semilattices.