English

Global dimension function on stability conditions and Gepner equations

Representation Theory 2022-11-03 v6 Algebraic Geometry

Abstract

We study the global dimension function gldim ⁣:Aut\StabD/CR0\operatorname{gldim}\colon\operatorname{Aut}\backslash\operatorname{Stab}\mathcal{D}/\mathbb{C}\to\mathbb{R}_{\ge0} on a quotient of the space of Bridgeland stability conditions on a triangulated category D\mathcal{D} as well as Toda's Gepner equatio Φ(σ)=sσ\Phi(\sigma)=s\cdot\sigma for some σStabD\sigma\in\operatorname{Stab}\mathcal{D} and (Φ,s)AutD×C(\Phi,s)\in\operatorname{Aut}\mathcal{D}\times\mathbb{C}. For the bounded derived category Db(kQ)\mathcal{D}^b(\mathbf{k} Q) of a Dynkin quiver QQ, we show that there is a unique minimal point σG\sigma_G of gldim\operatorname{gldim} (up to the C\mathbb{C}-action), with value 12/h1-2/h, which is the solution of the Gepner equation τ(σ)=(2/h)σ\tau(\sigma)=(-2/h)\cdot\sigma. Here τ\tau is the Auslander-Reiten functor and hh is the Coxeter number. This solution σG\sigma_G was constructed by Kajiura-Saito-Takahashi. We also show that for an acyclic non-Dynkin quiver QQ, the minimal value of gldim\operatorname{gldim} is 11. Our philosophy is that the infimum of gldim\operatorname{gldim} on StabD\operatorname{Stab}\mathcal{D} is the global dimension for the triangulated category D\mathcal{D}. We explain how this notion could shed light on the contractibility conjecture of the space of stability conditions.

Cite

@article{arxiv.1807.00010,
  title  = {Global dimension function on stability conditions and Gepner equations},
  author = {Yu Qiu},
  journal= {arXiv preprint arXiv:1807.00010},
  year   = {2022}
}

Comments

Final version, Math. Zeit. to appear

R2 v1 2026-06-23T02:46:28.366Z