9 June 2020, 5:30 pm IST / 12:00GMT / 08:00am EDT (joining time : 5:15 pm IST - 5:30 pm IST)
Google meet link: https://meet.google.com/gkc-hydx-fkn
Srikanth Iyengar, University of Utah - Modular representations of elementary abelian groups and commutative algebra - Part 1
In the first lecture of this series Huneke explained how the work on invariants of groups, due to Hilbert and Noether, lead to some of the modern developments in commutative algebra. In my talks I will discuss a different connection between representation theory of groups and commutative algebra. A starting point for this is the work of Jon Carlson, from the 1980s, on 'rank varieties' for modular representations of abelian groups of the form (ℤ/pℤ)c, where p is some prime number. The group algebra of such an elementary abelian group is a complete intersection ring and Carlson's theory of rank varieties has been extended to apply to all complete intersections. This development was initiated by Avramov and Buchweitz, and is still an area of active research. The aim of my talks is to give an introduction to these ideas, starting with the work of Carlson.
Time:
5:30pm-6:30pm
Description:
Date and Time: 12 June 2020, 5:30 pm IST / 12:00GMT / 08:00am EDT (joining
time : 5:15 pm IST - 5:30 pm IST)
Google meet link: https://meet.google.com/gkc-hydx-fkn
Speaker: Srikanth Iyengar, University of Utah.
Title: Modular representations of elementary abelian groups and
commutative algebra - Part 2
Abstract: In the first lecture of this series Huneke explained how the
work on invariants of groups, due to Hilbert and Noether, lead to some of
the modern developments in commutative algebra. In my talks I will discuss
a different connection between representation theory of groups and
commutative algebra. A starting point for this is the work of Jon Carlson,
from the 1980s, on 'rank varieties' for modular representations of abelian
groups of the form (ℤ/pℤ)^c, where p is some prime number. The
group algebra of such an elementary abelian group is a complete
intersection ring and Carlson's theory of rank varieties has been extended
to apply to all complete intersections. This development was initiated by
Avramov and Buchweitz, and is still an area of active research. The aim of
my talks is to give an introduction to these ideas, starting with the work
of Carlson.