2-Segal objects and the Waldhausen construction
DOI10.2140/agt.2021.21.1267zbMath1481.18025arXiv1809.10924OpenAlexW3195925653MaRDI QIDQ1983542
Claudia I. Scheimbauer, Martina Rovelli, Angélica M. Osorno, Julia E. Bergner, Viktoriya Ozornova
Publication date: 10 September 2021
Published in: Algebraic \& Geometric Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1809.10924
Simplicial sets and complexes in algebraic topology (55U10) Abstract and axiomatic homotopy theory in algebraic topology (55U35) Algebraic (K)-theory of spaces (19D10) Topological categories, foundations of homotopy theory (55U40) Homotopical algebra, Quillen model categories, derivators (18N40) 2-categories, bicategories, double categories (18N10)
Related Items (2)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Homotopical algebraic geometry. I: Topos theory
- A Thomason model structure on the category of small \(n\)-fold categories
- On left and right model categories and left and right Bousfield localizations
- 2-Segal sets and the Waldhausen construction
- Model structures on the category of small double categories
- Decomposition spaces, incidence algebras and Möbius inversion. I: Basic theory
- Iterated spans and classical topological field theories
- A universal characterization of higher algebraic \(K\)-theory
- Incidence bicomodules, Möbius inversion and a Rota formula for infinity adjunctions
- A note on the \((\infty,n)\)-category of cobordisms
- Homotopical algebra
- Complexe cotangent et déformations. II
- Waldhausen additivity: classical and quasicategorical
- On the algebraicK-theory of higher categories
- Categorical Homotopy Theory
- Higher algebraic K-theory: I
- Fibrations and geometric realizations
- SYMMETRIC MONOIDALG-CATEGORIES AND THEIR STRICTIFICATION
- Every 2-Segal space is unital
- Higher Segal Spaces
- Higher Topos Theory (AM-170)
This page was built for publication: 2-Segal objects and the Waldhausen construction
