Torsion in finite H-spaces and the homotopy of the three-sphere

Let $X$ be a 2-connected $p$-local finite $H$-space with a single cell in dimension three. We give a simple cohomological criterion which distinguishes when the inclusion $i$: $S^3 →X$ has the property that the loop of its three-connected cover is null homotopic. In particular, such a null homotopy implies that $π_m(i)=0 for m ≥4$. Applications are made to Harper’s rank 2 finite $H$-space and simple, simply-connected, compact Lie groups.

Keywords

$H$-space, Harper’s space, torsion Lie group, three sphere

2010 Mathematics Subject Classification

55P45, 55Q52

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Published 1 January 2010