Published online by Cambridge University Press: 17 April 2009
The main results proved in this note are the following:
(i) Any finitely generated group can be expressed as a quotient of a finitely presented, centreless group which is simultaneously Hopfian and co-Hopfian.
(ii) There is no functorial imbedding of groups (respectively finitely generated groups) into Hopfian groups.
(iii) We prove a result which implies in particular that if the double orientable cover N of a closed non-orientable aspherical manifold M has a co-Hopfian fundamental group then π1(M) itself is co-Hopfian.