# Realisability problem in arrow categories

**Authors:** Cristina Costoya, David M\'endez, Antonio Viruel

arXiv: 1901.03152 · 2019-10-09

## TL;DR

This paper investigates the realizability problem in arrow categories, establishing positive results for certain categories like graphs and differential graded algebras, and constructing functors to transfer these results to homotopy categories of topological spaces.

## Contribution

The paper introduces a functor from graphs to CDGA that helps solve the realizability problem in homotopy categories, extending known results to new categorical contexts.

## Key findings

- Positive realizability results for graphs and CDGA categories.
- Construction of a functor from graphs to CDGA categories.
- Partial solutions to the realizability problem in homotopy categories.

## Abstract

In this paper we raise the realisability problem in arrow categories. Namely, for a fixed category $\mathcal{C}$ and for arbitrary groups $H\le G_1\times G_2$, is there an object $\phi \colon A_1 \rightarrow A_2$ in $\operatorname{Arr}(\mathcal{C})$ such that $\operatorname{Aut}_{\operatorname{Arr}(\mathcal{C})}(\phi) = H$, $\operatorname{Aut}_{\mathcal{C}}(A_1) = G_1$ and $\operatorname{Aut}_{\mathcal{C}}(A_2) = G_2$? We are interested in solving this problem when $\mathcal C =\mathcal{H}oTop_*$, the homotopy category of pointed topological spaces. To that purpose, we first settle that question in the positive when $\mathcal C = \mathcal{G}raphs$.   Then, we construct an almost fully faithful functor from $\mathcal{G}raphs$ to $\operatorname{CDGA}$, the category of commutative differential graded algebras, that provides among other things, a positive answer to our question when $\mathcal C = \operatorname{CDGA}$ and, as long as we work with finite groups, when $\mathcal C =\mathcal{H}oTop_*$. Some results on representability of concrete categories are also obtained.

## Full text

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## Figures

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## References

20 references — full list in the complete paper: https://tomesphere.com/paper/1901.03152/full.md

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Source: https://tomesphere.com/paper/1901.03152