Derived functors: Two technical lemmas

In course

Aliqua Lorem veniam adipisicing amet ullamco nostrud ullamco in commodo Lorem laboris id fugiat. Proident sint amet commodo nisi ut ullamco officia quis amet cupidatat exercitation. Do ullamco commodo pariatur voluptate amet aliqua. Officia ea ullamco amet est occaecat veniam nisi ullamco enim voluptate commodo incididunt quis. Nisi elit aute mollit aliqua reprehenderit sunt laboris adipisicing et. Commodo esse voluptate qui ad sit Lorem laboris.

Description

This lecture focuses on two technical lemmas crucial for proving the Fundamental Theorem of homotopical algebra. The first lemma establishes the homotopy equivalence of two objects, while the second lemma involves a Quillen pair and morphisms between cofibrant and fibrant objects. The instructor presents detailed proofs for both lemmas, setting the stage for the upcoming proof of the Fundamental Theorem.

Instructor

Ad laboris proident velit nisi tempor ipsum. Sit nostrud cupidatat Lorem ut eu. Incididunt officia aliqua deserunt reprehenderit excepteur occaecat sunt non. Anim proident veniam ipsum eiusmod duis id. Mollit et mollit aliqua fugiat minim amet fugiat duis.

Official source

https://mediaspace.epfl.ch/media/0_h2qlg695

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.

Ontological neighbourhood

Related lectures (40)