Quasi-diagrams and gentle algebras

Abstract

Any gentle algebra $A$ with one maximal path corresponds to a unique quasi-diagram $α$. We introduce the regularity for $α$, and show that $A$ has finite global dimension if and only if $α$ is regular. We characterize regular quasi-diagrams which remain regular under the dihedral group action. We prove that the set of maximal chord diagrams is the "biggest" one among the sets closed under taking Koszul dual and rotations.

Figures (8)

• Figure 1: The oriented cycle with full relations
• Figure 2: The $\alpha\zeta$-orbit $w$
• Figure 3: Drawings of $\alpha$ (left), and $\alpha '$ (right)
• Figure 4: Glue $P_2$ by $\alpha=(13)(24)$
• Figure 5: Type I

Theorems & Definitions (59)

• Theorem 1.1: Theorem \ref{['thm-main']}
• Theorem 1.2
• Proposition 1.3
• Remark 2.2
• Example 2.4
• Remark 2.5
• Proposition 2.7: BH
• Lemma 2.8
• Corollary 2.9
• proof