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Nerve (category theory)
Sheaves and Homotopy Theory
Simplicial Sets, Nerves of Categories, Kan Complexes, Etc
Homotopy Coherent Structures
Quasi-Categories Vs Simplicial Categories
Comparison of Waldhausen Constructions
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Quasicategories 1.1 Simplicial Sets
A Model Structure for Quasi-Categories
Arxiv:1311.4128V4 [Math.QA] 18 Sep 2015 Ob Klocalization
Optimal Triangulation of Regular Simplicial Sets
Symmetric Monoidal Categories Model All
An Introduction to Simplicial Homotopy Theory
Algebraic Topology I
On the Geometry of 2-Categories and Their Classifying Spaces ∗
Introduction to Higher Category Theory
Homotopy Localization of Groupoids
A Leisurely Introduction to Simplicial Sets
A Short Course on ∞-Categories
Top View
The Theory of Quasi-Categories and Its Applications
The Generalized Persistent Nerve Theorem
A Survey of Simplicial Sets
Higher Categories Student Seminar
Model Categories, Infinity Categories and Spectra
Notes on Quasi-Categories
Topology of Nerves and Formal Concepts
Homotopy Theory and Classifying Spaces
Symmetric Monoidal Categories and $\Gamma $-Categories
Notes on Simplicial Homotopy Theory
Introduction to Homotopy Theory in Nlab
Notes on Quasi-Categories
The Block Structure Spaces of Real Projective Spaces and Orthogonal Calculus of Functors II Tibor Macko and Michael Weiss (Communicated by Andrew Ranicki)
DELIGNE GROUPOID REVISITED 1. Introduction
Motivating the Definition of Monoidal Infinity Category
NOTES on CHAPTER 1 of HTT §1. a Category Has a Set (Or Class) Of
Motivic Cell Structures for Projective Spaces Over Split Quaternions
Homotopy Coherent Nerve in Deformation Theory
Homotopical Algebra
Categories and Orbispaces 3
Homotopy Inverses for Nerve by Rudolf Fritsch and Dana May Latch
Higher Category Theory
CATEGORIES Contents Basic Notions 1 Equivalences Between Quasi-Categories 3 Quasi-Categories As
Lecture 1: Higher Categories: Introduction and Background
On Higher Quasi-Categories
Introduction to ∞-Categories
On the Structure of Simplicial Categories Associated to Quasi-Categories
The Operadic Nerve, Relative Nerve, and the Grothendieck Construction
Symmetric Monoidal Categories and Γ-Categories
Rigidification of Quasi-Categories
GEOMETRIC HIGHER GROUPOIDS and CATEGORIES This Paper
Modeling Homotopy Theories
A Cellular Nerve for Higher Categories
The Path Category PX for a Simplicial Set X Is the Category Generated by the Graph X1 ⇒ X0 of 1- Simplices X : D1(X) → D0(X), Subject to the Relations
A MODEL for the HOMOTOPY THEORY of HOMOTOPY THEORY 1. Introduction Quillen Introduced the Notion of a Closed Model Category
Universal Simplicial Bundles and Inner Automorphism N-Groups