The odd primary order of the commutator on low rank Lie groups

Abstract

Let G be a simply-connected, compact, simple Lie group of low rank relative to a fixed prime p. After localization at p, there is a space A which "generates" G in a certain sense. Assuming G satisfies a homotopy nilpotency condition relative to p, we show that the Samelson product IdG, IdG of the identity of G equals the order of the Samelson product , of the inclusion :A G. Applying this result, we calculate the orders of IdG,IdG for all p-regular Lie groups and give bounds on the orders of IdG,IdG for certain quasi-p-regular Lie groups.