English

On weakly negative subcategories, weight structures, and (weakly) approximable triangulated categories

K-Theory and Homology 2019-07-23 v1 Algebraic Geometry Category Theory

Abstract

We prove that certain triangulated categories are (weakly) approximable in the sense of A. Neeman. We prove that a triangulated CC that is compactly generated by a single object GG is weakly approximable if C(G,G[i])=0C(G,G[i])=0 for i>1i>1 (we say that GG is weakly negative if this assumption is fulfilled; the case where the equality C(G,G[1])=0C(G,G[1])=0 is fulfilled as well was mentioned by Neeman himself). Moreover, if G0inGiG\cong \bigoplus_{0\le i\le n}G_i and C(Gi,Gj[1])=0C(G_i,G_j[1])=0 whenever iji\le j then CC is also approximable. The latter result can be useful since (under a few more additional assumptions) it allows to characterize a certain explicit subcategory of CC as the category of finite cohomological functors from the subcategory CcC^c of compact objects of CC into RR-modules (for a noetherian commutative ring RR such that CC is RR-linear). One may apply this statement to the construction of certain adjoint functors and tt-structures. Our proof of (weak) approximability of CC under the aforementioned assumptions is closely related to (weight decompositions for) certain (weak) weight structures, and we discuss this relationship in detail.

Keywords

Cite

@article{arxiv.1907.09412,
  title  = {On weakly negative subcategories, weight structures, and (weakly) approximable triangulated categories},
  author = {Mikhail V. Bondarko and Sergei V. Vostokov},
  journal= {arXiv preprint arXiv:1907.09412},
  year   = {2019}
}

Comments

This note justifies and extends an important remark of A. Neeman, and relates it to so-called weak weight structures. Comments are really welcome!

R2 v1 2026-06-23T10:27:20.252Z