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

**Authors:** Mikhail V. Bondarko, Sergei V. Vostokov

arXiv: 1907.09412 · 2019-07-23

## TL;DR

This paper establishes conditions under which certain triangulated categories are (weakly) approximable, linking these properties to weight structures and providing tools for constructing adjoint functors and t-structures.

## Contribution

It proves new criteria for (weak) approximability of triangulated categories based on weak negativity and decompositions, connecting these to weight structures.

## Key findings

- Triangulated categories with a weakly negative generator are weakly approximable.
- Categories with a decomposable generator satisfying certain vanishing conditions are approximable.
- Explicit subcategories can be characterized via finite cohomological functors under these conditions.

## Abstract

We prove that certain triangulated categories are (weakly) approximable in the sense of A. Neeman. We prove that a triangulated $C$ that is compactly generated by a single object $G$ is weakly approximable if $C(G,G[i])=0$ for $i>1$ (we say that $G$ is weakly negative if this assumption is fulfilled; the case where the equality $C(G,G[1])=0$ is fulfilled as well was mentioned by Neeman himself). Moreover, if $G\cong \bigoplus_{0\le i\le n}G_i$ and $C(G_i,G_j[1])=0$ whenever $i\le j$ then $C$ 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 $C$ as the category of finite cohomological functors from the subcategory $C^c$ of compact objects of $C$ into $R$-modules (for a noetherian commutative ring $R$ such that $C$ is $R$-linear). One may apply this statement to the construction of certain adjoint functors and $t$-structures.   Our proof of (weak) approximability of $C$ under the aforementioned assumptions is closely related to (weight decompositions for) certain (weak) weight structures, and we discuss this relationship in detail.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1907.09412/full.md

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Source: https://tomesphere.com/paper/1907.09412