Rank-stability of polynomial equations

Seminar
Speaker
Tomer Bauer (Bar-Ilan University)
Date
14/02/2024 - 11:30 - 10:30Add to Calendar 2024-02-14 10:30:00 2024-02-14 11:30:00 Rank-stability of polynomial equations Ulam's stability problem asks when an 'almost' solution of an equation is 'close' to an exact solution. Extending the thoroughly studied theory of group stability, we study Ulam stability type problems for associative and Lie algebras. Namely, we investigate obstacles to rank-approximation of 'almost' solutions by exact solutions for systems of non-commutative polynomial equations.   This leads to a rich theory of stable associative and Lie algebras, with connections to linear soficity, amenability, growth, and group stability. We develop rank-stability and instability tests, examine the effect of algebraic constructions on rank-stability, and prove that while finite-dimensional associative algebras are rank-stable, 'most' finite-dimensional Lie algebras are not.   Joint work with Guy Blachar and Be'eri Greenfeld. ================================================ https://us02web.zoom.us/j/87856132062 Meeting ID: 878 5613 2062 Third floor seminar room and Zoom אוניברסיטת בר-אילן - Department of Mathematics mathoffice@math.biu.ac.il Asia/Jerusalem public
Place
Third floor seminar room and Zoom
Abstract

Ulam's stability problem asks when an 'almost' solution of an equation is 'close' to an exact solution. Extending the thoroughly studied theory of group stability, we study Ulam stability type problems for associative and Lie algebras. Namely, we investigate obstacles to rank-approximation of 'almost' solutions by exact solutions for systems of non-commutative polynomial equations.

 

This leads to a rich theory of stable associative and Lie algebras, with connections to linear soficity, amenability, growth, and group stability. We develop rank-stability and instability tests, examine the effect of algebraic constructions on rank-stability, and prove that while finite-dimensional associative algebras are rank-stable, 'most' finite-dimensional Lie algebras are not.

 

Joint work with Guy Blachar and Be'eri Greenfeld.

================================================

https://us02web.zoom.us/j/87856132062

Meeting ID: 878 5613 2062

Last Updated Date : 14/02/2024