Abstract
Abstract
Let
$M(A,n)$
be the Moore space of type
$(A,n)$
for an Abelian group A and
$n\ge 2$
. We show that the loop space
$\Omega (M(A,n))$
is homotopy nilpotent if and only if A is a subgroup of the additive group
$\mathbb {Q}$
of the field of rationals. Homotopy nilpotency of loop spaces
$\Omega (M(A,1))$
is discussed as well.
Publisher
Canadian Mathematical Society
Cited by
1 articles.
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