Abstract
An Abelian group is said to be R-Hopfian [L-co-Hopfian] if every surjective [injective] endomorphism has a right [left] inverse. An Abelian group G is said to be hereditarily R-Hopfian [hereditarily L-co-Hopfian] if each subgroup of G is R-Hopfian [L-co-Hopfian]; similarly G is super R-Hopfian [super L-co-Hopfian] if each homomorphic image of G is R-Hopfian [L-co-Hopfian]. The various classes of hereditarily and super R-Hopfian and L-co-Hopfian groups are studied and necessary conditions for groups to have these properties are derived; in several, but not all, cases, sufficient conditions are also obtained.
| Original language | English |
|---|---|
| Pages (from-to) | 1889-1901 |
| Number of pages | 13 |
| Journal | Communications in Algebra |
| Volume | 46 |
| Issue number | 5 |
| DOIs | |
| Publication status | Published - 4 May 2018 |
Keywords
- Abelian groups
- Hopfian groups
- co-Hopfian groups
- hereditarily R-Hopfian and L-co-Hopfian groups
- super R-Hopfian and L-co-Hopfian groups