 | This article is an orphan, as no other articles link to it. Please introduce links to this page from related articles; try the Find link tool for suggestions. (March 2017) |
In algebra, a nice subgroup H of an abelian p-group G is a subgroup such that p(G/H) = 〈pG,H〉/H for all ordinals α. Nice subgroups were introduced by Hill (1967). Knice subgroups are a modification of this introduced by Hill & Megibben (1986).
References
- Griffith, Phillip A. (1970), Infinite abelian group theory, The University of Chicago Press, Chicago, Ill.-London, ISBN 978-0-226-30870-8, MR 0289638
- Hill, Paul (1967), On the classification of abelian groups, Xeroxed manuscript
- Hill, Paul; Megibben, Charles (1986), "Axiom 3 modules", Transactions of the American Mathematical Society, 295 (2): 715–734, doi:10.2307/2000060, ISSN 0002-9947, JSTOR 2000060, MR 0833705