Friday, October 29, 2021
12:00-1:00 PM
Online
Off Campus Location
This talk is about the strength of homogeneous polynomials. The strength is a subadditive invariant determined by the convention that a nonzero polynomial has strength 1 exactly when it is reducible. This invariant has been defined by Ananyan and Hochster in their paper proving Stillman's conjecture and has appeared in various works since.
- Why look at the strength of polynomials?
- How do you compute it?
- Is bounded strength a closed condition?
- What is the strength of a generic polynomial?
I will answer some of these questions. Speaker(s): Arthur Bik (Max Planck)
- Why look at the strength of polynomials?
- How do you compute it?
- Is bounded strength a closed condition?
- What is the strength of a generic polynomial?
I will answer some of these questions. Speaker(s): Arthur Bik (Max Planck)
| Building: | Off Campus Location |
|---|---|
| Location: | Off Campus Location |
| Event Type: | Workshop / Seminar |
| Tags: | Mathematics |
| Source: | Happening @ Michigan from Department of Mathematics |
