Localizing Invariants and Algebraic K-theory - Part 1
Offered By: Institut des Hautes Etudes Scientifiques (IHES) via YouTube
Course Description
Overview
Explore a comprehensive lecture on localizing invariants and algebraic K-theory presented by Georg Tamme from the University of Mainz. Delve into the fundamental insights of Thomason, building upon Waldhausen's work, which define algebraic K-theory through the category of perfect complexes. Examine how K-theory transforms Verdier quotient sequences into fiber sequences of spectra, establishing it as a localizing invariant. Investigate the descent properties of K-theory and other localizing invariants, including Nisnevich descent. Journey through classical topics in the field and discover recent developments and applications, with a particular focus on algebraic K-theory. The lecture covers key concepts such as classical K-theory, incompletion, non-connective K-theory, Schlitting, and includes proofs, corollaries, and counter-examples to deepen understanding of this complex mathematical subject.
Syllabus
Introduction
Classical Ktheory
Incompletion
Localizing invariant
Nonconnective Ktheory
Schlitting
Blackbox
Proof
Corollary
Counter example
Taught by
Institut des Hautes Etudes Scientifiques (IHES)
Related Courses
Computational Commutative AlgebraChennai Mathematical Institute via Swayam Introduction to Algebraic Topology (Part-II)
NPTEL via Swayam Applications of Topological Cyclic Homology in Algebraic K-Theory
Fields Institute via YouTube Representations of Acyclic Quivers and Auslander-Reiten Sequences - Lecture 1
International Centre for Theoretical Sciences via YouTube A Homological Interpretation of Higher Du Bois and Higher Rational Singularities
IMSA via YouTube