On straightening for Segal spaces-Reference-Cited by-同舟云学术

On straightening for Segal spaces

Published:2024-02-23 Issue:3 Volume:160 Page:586-656
ISSN:0010-437X
Container-title:Compositio Mathematica
language:en
Short-container-title:Compositio Math.

Author:

Nuiten Joost^ORCID

Abstract

The straightening–unstraightening correspondence of Grothendieck–Lurie provides an equivalence between cocartesian fibrations between

$(\infty, 1)$

-categories and diagrams of

$(\infty, 1)$

-categories. We provide an alternative proof of this correspondence, as well as an extension of straightening–unstraightening to all higher categorical dimensions. This is based on an explicit combinatorial result relating two types of fibrations between double categories, which can be applied inductively to construct the straightening of a cocartesian fibration between higher categories.

Publisher

Wiley

Reference47 articles.

1. Yoneda lemma for enriched $\infty$-categories;Hinich;Adv. Math,2020

2. A bivariant Yoneda lemma and $(\infty,2)$-categories of correspondences;Macpherson;Algebr. Geom. Topol,2022

3. Nui16 Nuiten, J. , Localizing $\infty$ -categories with hypercovers, Preprint (2016), arXiv:1612.03800.

4. Enriched $\infty$-categories via non-symmetric $\infty$-operads;Gepner;Adv. Math,2015

5. CHS21 Calaque, D. , Haugseng, R. and Scheimbauer, C. , The AKSZ construction in derived algebraic geometry as an extended topological field theory, Mem. Amer. Math. Soc., to appear. Preprint (2021), arXiv:2108.02473.

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