A construction of simple-minded systems over domestic Brauer graph algebras I: the 2-domestic case
Abstract
Let A be a 2-domestic Brauer graph algebra. We present a construction for a family of objects on A- to be a simple-minded system and our construction provides all simple-minded systems on A-. As a byproduct, we provide a new proof of AR-conjecture for 2-domestic Brauer graph algebras and we prove that a weakly simple-minded system with a finite cardinality is a simple-minded system on A-. We also prove that an orthogonal system S which contains at least one object for an Euclidean component extends to a simple-minded system on A- and its extension closure F(S) is functorially finite.
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