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arXiv:2405.02860v1 Announce Type: new
Abstract: To determine an algebra is quasi-hereditary is a difficult problem. An effective method, Green-Schroll set, is introduced in this paper to tackle this problem. It is well known that an algebra is quasi-hereditary if and only if it admits a quasi-hereditary ordering of simple modules. Let $A$ be a Nakayama algebra. We prove a necessary and sufficient criterion to determine whether an ordering of simple modules is quasi-hereditary on $A$, and $A$ is quasi-hereditary if and only if its Green-Schroll set is nonempty. This seems to be the simplest characterization currently known, since it does not involve any algebraic concepts. A general iteration formula for the number $q(A)$ of all quasi-hereditary orderings of $A$ is given via Green-Schroll set. The $q$-ordering conjecture is proved to be true for $A$.
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