Hopfian group
In mathematics, a Hopfian group is a group G for which every epimorphism
- G → G
is an isomorphism. Equivalently, a group is Hopfian if and only if it is not isomorphic to any of its proper quotients. A group G is co-Hopfian if every monomorphism
- G → G
is an isomorphism. Equivalently, G is not isomorphic to any of its proper subgroups.
Examples of Hopfian groups
- Every finite group, by an elementary counting argument.
- More generally, every polycyclic-by-finite group.
- Any finitely generated free group.
- The group Q of rationals.
- Any finitely generated residually finite group.
- Any torsion-free word-hyperbolic group.
Examples of non-Hopfian groups
- Quasicyclic groups.
- The group R of real numbers.
- The Baumslag–Solitar group B(2,3).
Properties
It was shown by Collins (1969) that it is an undecidable problem to determine, given a finite presentation of a group, whether the group is Hopfian. Unlike the undecidability of many properties of groups this is not a consequence of the Adian–Rabin theorem, because Hopficity is not a Markov property, as was shown by Miller & Schupp (1971).
References
- Collins, D. J. (1969). "On recognising Hopf groups". Archiv der Mathematik. 20 (3): 235–240. doi:10.1007/BF01899291. S2CID 119354919.
- Johnson, D. L. (1990). Presentations of groups. London Mathematical Society Student Texts. Vol. 15. Cambridge University Press. p. 35. ISBN 0-521-37203-8.
- Miller, C. F.; Schupp, P. E. (1971). "Embeddings into hopfian groups". Journal of Algebra. 17 (2): 171. doi:10.1016/0021-8693(71)90028-7.
External links
 | This abstract algebra-related article is a stub. You can help Wikipedia by expanding it. |