Basic Notions Seminar - Polymath 14: From word games to an analysis-definition of abelian groups (25 May 2026)

Administration

Description

Abstract:

Consider the following three properties of a general group G:

Algebra: G is abelian and torsion-free.
Analysis: G is a metric space that admits a "norm", namely, a translation-invariant metric d(.,.) satisfying: d(1,g^n) = |n| d(1,g) for all g in G and integers n.
Geometry: G admits a length function with "saturated" subadditivity for equal arguments: l(g^2) = 2 l(g) for all g in G.

While these properties may a priori seem different, in fact, they turn out to be equivalent. The nontrivial implication amounts to saying that there does not exist a non-abelian group with a “norm”.

We will discuss some of the proofs of these equivalences, as well as the logistics of how the problem was solved, via a PolyMath project that began on a blogpost of Terence Tao.

(Joint - as D.H.J. PolyMath - with Tobias Fritz, Siddhartha Gadgil, Pace Nielsen, Lior Silberman, and Terence Tao.)

Basic Notions Seminar - Polymath 14: From word games to an analysis-definition of abelian groups

Go to day