Introduction to simplicial sets: Simplicial sets

About
Privacy
Disclaimer

Graph Chatbot

In course

Do et velit minim occaecat non Lorem. In cupidatat et enim voluptate non voluptate nulla laborum. Commodo et dolore aliquip incididunt ex id culpa nisi anim pariatur culpa labore fugiat nostrud. Proident fugiat nisi veniam dolor ad fugiat tempor nisi duis occaecat excepteur minim. Ipsum aute pariatur incididunt irure eu commodo deserunt voluptate. Lorem reprehenderit do dolor adipisicing ut occaecat. Cupidatat ullamco occaecat adipisicing irure non.

Description

This lecture introduces the category of simplicial sets, defined as functors from the simplex category to the category of simplicial sets. The standard n-simplex is presented as a fundamental example, showcasing its universal properties.

Official source

Ontological neighbourhood

Mathematics

Topology: Algebraic topology

Related lectures (32)

https://mediaspace.epfl.ch/media/0_e94052rp

About this result

This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.

In course

DEMO: nulla occaecat aliqua

Ontological neighbourhood

Mathematics

Topology: Algebraic topology

Related lectures (32)

Simplicial and Cosimplicial Objects: Examples and Applications

Covers simplicial and cosimplicial objects in category theory with practical examples.

Natural Transformations in Algebra

Explores natural transformations in algebra, defining functors and isomorphisms.

Limits and colimits as adjoints: Chapter 1(c)

Explores the characterization of limits and colimits as adjoints in category theory.

Homotopical Algebra: Functor and Adjunctions

Delves into homotopical algebra, defining functors and adjunctions with examples.

Active Learning Session

Explores natural transformations in group theory and category theory, emphasizing functor composition and morphism composition.