Quasi-Hereditary Orderings of Nakayama Algebras

Abstract

Let A be an algebra with iso-class of simple modules S of cardinality n. A total ordering on S making every Weyl module Schurian and every indecomposable projective module filtered by the Weyl modules is called to be a quasi-hereditary ordering or q-ordering on A and A is a quasi-hereditary algebra under this ordering. The number of q-orderings on A is denoted by q(A). To determine whether an ordering on S is a q-ordering is a hard problem. A famous result due to Dlab and Ringel is that A is hereditary if and only if every ordering is a q-ordering, equivalently, q(A)=n!. The twenty-years old q-ordering conjecture claims that q(A)23n!. The present paper proves a very simple criterion for q-orderings when A is a Nakayama algebra. This criterion is applied to getting a full classification of all q-orderings of A and an explicit iteration formula for q(A), and also a positive proof of the q-ordering conjecture for Nakayama algebras.

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