A^1-Algebraic Topology and Unstable Motivic Homotopy Theory - Part 4
IAS | PCMI Park City Mathematics Institute via YouTube
Overview
Explore the fourth lecture in a series on unstable motivic homotopy theory, delivered by Joseph Ayoub from Universität Zürich at the PCMI Park City Mathematics Institute. Delve into the Morel-Voevodsky category of motivic spaces and examine Morel's fundamental theorems on homotopy sheaves of motivic spaces, along with his computation of the first unstable homotopy sheaves of motivic spheres. Drawing from Morel's book "A^1-algebraic topology over a field," learn key concepts in algebraic topology while building upon basic knowledge of algebraic geometry and algebraic topology. Access supplementary materials including detailed lecture notes and problem sets to reinforce understanding of this advanced mathematical topic. Part of the 2024 Graduate Summer School program focusing on Motivic Homotopy Theory, this 59-minute lecture contributes to a comprehensive exploration of how motivic homotopy theory has become a powerful tool in understanding arithmetic aspects of algebra and algebraic geometry.
Syllabus
A^1-algebraic topology (following F. Morel) part 4 | Joseph Ayoub, Universität Zürich
Taught by
IAS | PCMI Park City Mathematics Institute