English

Non-semistable exceptional objects in hereditary categories

Category Theory 2013-11-28 v1 Algebraic Geometry Representation Theory

Abstract

For a given stability condition σ\sigma on a triangulated category we define a σ\sigma-exceptional collection as an Ext-exceptional collection, whose elements are σ\sigma-semistable with phases contained in an open interval of length one. If there exists a full σ\sigma-exceptional collection, then σ\sigma is generated by this collection in a procedure described by E. Macr\`i. Constructing σ\sigma-exceptional collections of length at least three in Db(A)D^b(\mathcal A) from a non-semistable exceptional object, where A\mathcal A is a hereditary hom-finite abelian category, we introduce certain conditions on the Ext-nontrivial couples (couples of exceptional objects X,YAX,Y\in \mathcal A with Ext1(X,Y)0{\rm Ext}^1(X,Y)\neq 0 and Ext1(Y,X)0{\rm Ext}^1(Y,X)\neq 0). After a detailed study of the exceptional objects of two tame quivers Q1Q_1 and Q2Q_2 with three and four vertices, respectively, we observe that the needed conditions do hold in Repk(Q1)Rep_k(Q_1), Repk(Q2)Rep_k(Q_2), where kk is an algebraically closed field. Combining these findings, we prove that for each σStab(Db(Q1))\sigma\in {\rm Stab}(D^b(Q_1)) there exists a full σ\sigma-exceptional collection. It follows that Stab(Db(Q1)){\rm Stab}(D^b(Q_1)) is connected.

Keywords

Cite

@article{arxiv.1311.7125,
  title  = {Non-semistable exceptional objects in hereditary categories},
  author = {George Dimitrov and Ludmil Katzarkov},
  journal= {arXiv preprint arXiv:1311.7125},
  year   = {2013}
}

Comments

65 pages

R2 v1 2026-06-22T02:16:23.687Z