English

Frobenius morphisms and stability conditions

Representation Theory 2022-11-03 v5

Abstract

We generalize Deng-Du's folding argument, for the bounded derived category D(Q)\mathcal{D}(Q) of an acyclic quiver QQ, to the finite dimensional derived category D(ΓQ)\mathcal{D}(\Gamma Q) of the Ginzburg algebra ΓQ\Gamma Q associated to QQ. We show that the FF-stable category of D(ΓQ)\mathcal{D}(\Gamma Q) is equivalent to the finite dimensional derived category D(ΓS)\mathcal{D}(\Gamma\mathbb{S}) of the Ginzburg algebra ΓS\Gamma\mathbb{S} associated to the species S\mathbb{S}, which is folded from QQ. If (Q,S)(Q,\mathbb{S}) is of Dynkin type, we prove that StabD(S)\operatorname{Stab}\mathcal{D}(\mathbb{S}) (resp. the principal component StabD(ΓS)\operatorname{Stab}^\circ\mathcal{D}(\Gamma\mathbb{S})) of the space of the stability conditions of D(S)\mathcal{D}(\mathbb{S}) (resp. D(ΓS)\mathcal{D}(\Gamma\mathbb{S})) is canonically isomorphic to FStabD(Q)\operatorname{FStab}\mathcal{D}(Q) (resp. the principal component FStabD(ΓQ)\operatorname{FStab}^\circ\mathcal{D}(\Gamma Q)) of the space of FF-stable stability conditions of D(Q)\mathcal{D}(Q) (resp. D(ΓQ)\mathcal{D}(\Gamma Q)). There are two applications. One is for the space NStabD(ΓQ)\operatorname{NStab}\mathcal{D}(\Gamma Q) of numerical stability conditions in StabD(ΓQ)\operatorname{Stab}^\circ\mathcal{D}(\Gamma Q). We show that NStabD(ΓQ)\operatorname{NStab}\mathcal{D}(\Gamma Q) consists of BrQ/BrS\operatorname{Br} Q/\operatorname{Br} \mathbb{S} many connected components, each of which is isomorphic to StabD(ΓS)\operatorname{Stab}^\circ\mathcal{D}(\Gamma\mathbb{S}), for (Q,S)(Q,\mathbb{S}) is of type (A3,B2)(A_3, B_2) or (D4,G2)(D_4, G_2). The other is that we relate the FF-stable stability conditions to the Gepner type stability conditions.

Keywords

Cite

@article{arxiv.1210.0243,
  title  = {Frobenius morphisms and stability conditions},
  author = {Wen Chang and Yu Qiu},
  journal= {arXiv preprint arXiv:1210.0243},
  year   = {2022}
}

Comments

Last version, Pulb. R.I.M.S. to appear

R2 v1 2026-06-21T22:13:35.514Z