Homotopy Type Theory divisible group > history (Rev #7, changes)

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~~Definition~~
An abelian group $G$ is a divisible group if there exists a multiplicative $\mathbb{Z}_{+}$ -action $\alpha:\mathbb{Z}_{+} \to (G \to G)$ , where $\mathbb{Z}_{+}$ is the positive integers, such that for all $n:\mathbb{Z}_{+}$ and all $g:G$ , the fiber of $\alpha(n)$ at $g$ is contractible:
~~$\prod_{n:\mathbb{Z}_{+}} \prod_{g:G} \mathrm{isContr}(\mathrm{fiber}(\alpha(n),g))$~~
~~See also~~

abelian group

rational numbers

torsion-free divisible group

~~References~~

~~Phillip A. Griffith (1970), Infinite Abelian group theory. Chicago Lectures in Mathematics. University of Chicago Press. ISBN 0-226-30870-7~~

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