A number-theoretic approach to homotopy exponents of SU(n)
arXiv:math/0508083
Abstract
We use methods of combinatorial number theory to prove that, for each $n>1$ and any prime $p$, some homotopy group $Ï_i(SU(n))$ contains an element of order $p^{n-1+ord_p([n/p]!)}$, where $ord_p(m)$ denotes the largest integer $α$ such that $p^α$ divides $m$.
20 pages