# Higher Segal spaces and Lax $\mathbb{A}_\infty$-algebras

**Authors:** Adam Gal, Elena Gal

arXiv: 1905.03376 · 2019-07-17

## TL;DR

This paper explores the deep connection between higher Segal spaces and lax $	ext{A}_	ext{infty}$-algebras, formalizing how higher associativity structures relate to simplicial objects satisfying Segal conditions.

## Contribution

It introduces the concept of $d$-lax $	ext{A}_	ext{infty}$-algebra objects and establishes their equivalence with $(d+1)$-Segal objects, generalizing previous notions.

## Key findings

- Higher associators are invertible for $n \,\geq\, d$.
- $d$-Segal conditions imply invertibility of associators.
- Construction links simplicial objects to higher algebraic structures.

## Abstract

The notion of a higher Segal space was introduced by Dyckerhoff and Kapranov as a general framework for studying higher associativity inherent in a wide range of mathematical objects. In the present work we formalize the connection between this notion and the notion of $\mathbb{A}_\infty$-algebra. We introduce the notion of a "$d$-lax $\mathbb{A}_\infty$-algebra object" which generalizes the notion of an $\mathbb{A}_\infty$-algebra object. We describe a construction that assigns to a simplicial object $S_\bullet$ in a category $\mathscr{S}$ a datum of higher associators. We show that this datum defines a $d$-lax $\mathbb{A}_\infty$-algebra object in the category of correspondences in $\mathscr{S}$ precisely when $S_\bullet$ is a $(d+1)$-Segal object. More concretely we prove that for $n\geq d$ the "$n$-dimensional associator" is invertible. The so called "upper" and "lower" $d$-Segal conditions which originally come from the geometry of polytopes appear naturally in our construction as the two conditions which together imply the invertibility of the $d$-dimensional associator. A corollary is that for $d=2$, our construction defines an $\mathbb{A}_\infty$-algebra in the $(\infty,1)$-category of correspondences in $\mathscr{S}$ with the $2$-Segal conditions implying invertibility of all associativity data.

---
Source: https://tomesphere.com/paper/1905.03376