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Free actions of p-groups (p>3) on Sn×Sn
Published online by Cambridge University Press: 18 May 2009
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In [3] P. E. Conner showed that no abelian group with rank greater than 2 can act freely on Sn×Sn, the product of two spheres. G. Lewis [6] studied free actions of p-groups on Sn×Sn, when n is odd, n≢−l(p) and p is an odd prime. He showed that any p-group which has such an action must be abelian.
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- Copyright © Glasgow Mathematical Journal Trust 1982
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