The symmetric action on secondary homotopy groups
classification
🧮 math.AT
math.CT
keywords
grouphomotopysymmetricgroupssecondaryactionactsapplication
read the original abstract
We show that the symmetric track group, which is an extension of the symmetric group associated to the second Stiefel- Withney class, acts as a crossed module on the secondary homotopy group of a pointed space. An application is given to cup-one products in unstable homotopy groups of spheres, generalizing a formula of Barratt-Jones-Mahowald.
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