On weakly negative subcategories, weight structures, and (weakly) approximable triangulated categories
Abstract
We prove that certain triangulated categories are (weakly) approximable in the sense of A. Neeman. We prove that a triangulated that is compactly generated by a single object is weakly approximable if for (we say that is weakly negative if this assumption is fulfilled; the case where the equality is fulfilled as well was mentioned by Neeman himself). Moreover, if and whenever then 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 as the category of finite cohomological functors from the subcategory of compact objects of into -modules (for a noetherian commutative ring such that is -linear). One may apply this statement to the construction of certain adjoint functors and -structures. Our proof of (weak) approximability of under the aforementioned assumptions is closely related to (weight decompositions for) certain (weak) weight structures, and we discuss this relationship in detail.
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!