Explore the intricacies of tensor power decomposition in group representations during this 53-minute conference talk by Victor Ostrik at BIMSA. Delve into joint research with K. Coulembier, P. Etingof, and D. Tubbenhauer, examining the asymptotic behavior of indecomposable summands in tensor powers V^⊗n of finite-dimensional group representations. Investigate methods for counting these summands, with a focus on non-negligible components in algebraically closed fields. Discover how recent advancements in symmetric tensor category theory contribute to answering fundamental questions about the growth and structure of tensor powers in group representation theory.
Overview
Syllabus
Victor Ostrik: Growth in tensor powers #ICBS2024
Taught by
BIMSA
Related Courses
-
Growth in Tensor Powers
-
Growth in Tensor Powers - Representation Theory
-
Growth and Tensor Products in Representation Theory - Lecture 1
-
Symmetric Tensor Categories of Moderate Growth
-
Support Varieties and the Tensor Product Property - Lecture
-
Representations of General Linear Groups in the Verlinde Category
