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arxiv: 1608.02220 · v5 · pith:YEOQ2JTHnew · submitted 2016-08-07 · 🧮 math.GR · math.AT· math.CT

The abelianization of inverse limits of groups

classification 🧮 math.GR math.ATmath.CT
keywords groupsmathcalabelianizationfunctoradjointcountablekernelleft
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The abelianization is a functor from groups to abelian groups, which is left adjoint to the inclusion functor. Being a left adjoint, the abelianization functor commutes with all small colimits. In this paper we investigate the relation between the abelianization of a limit of groups and the limit of their abelianizations. We show that if $\mathcal{T}$ is a countable directed poset and $G:\mathcal{T}\longrightarrow\mathcal{G} rp$ is a diagram of groups that satisfies the Mittag-Leffler condition, then the natural map $$\mathrm{Ab}(\lim_{t\in\mathcal{T}}G_t)\longrightarrow\lim_{t\in\mathcal{T}}\mathrm{Ab}(G_t)$$ is surjective, and its kernel is a cotorsion group. In the special case of a countable product of groups, we show that the Ulm length of the kernel does not exceed $\aleph_1$.

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