proof of properties of Hopfian and co-Hopfian groups


PropositionPlanetmathPlanetmath. A group G is Hopfian if and only if every surjectivePlanetmathPlanetmath homomorphismMathworldPlanetmathPlanetmathPlanetmathPlanetmathPlanetmathPlanetmathPlanetmathPlanetmath GG is an automorphism.

Proof. “” Assume that ψ:GG is a surjective homomorpism such that ψ is not an automorphism, which means that Ker(ψ) is nontrivial. Then (due to the First Isomorphism TheoremPlanetmathPlanetmath) G/Ker(ψ) is isomorphic to Im(ψ)=G. ContradictionMathworldPlanetmathPlanetmath, since G is Hopfian.

” Assume that G is not Hopfian. Then there exists nontrivial normal subgroupMathworldPlanetmath H of G and an isomorphism ϕ:G/HG. Let π:GG/H be the quotient homomorphism. Then obviously πϕ:GG is a surjective homomorphism, but Ker(πϕ)=H is nontrivial, therefore πϕ is not an automorphism. Contradiction.

Proposition. A group G is co-Hopfian if and only if every injectivePlanetmathPlanetmath homomorphism GG is an automorphism.

Proof. “” Assume that ψ:GG is an injective homomorphism which is not an automorphism. Therefore Im(ψ) is a proper subgroupMathworldPlanetmath of G, therefore (since Ker(ψ)={e} and due to the First Isomorphism Theorem) G is isomorphic to its proper subgroup, namely Im(ψ). Contradiction, since G is co-Hopfian.

” Assume that G is not co-Hopfian. Then there exists a proper subgroup H of G and an isomorphism ϕ:GH. Let i:HG be an inclusion homomorphism. Then iϕ:GG is an injective homomorphism which is not onto (because i is not). Contradiction.

Title proof of properties of Hopfian and co-Hopfian groups
Canonical name ProofOfPropertiesOfHopfianAndCoHopfianGroups
Date of creation 2013-03-22 18:31:17
Last modified on 2013-03-22 18:31:17
Owner joking (16130)
Last modified by joking (16130)
Numerical id 6
Author joking (16130)
Entry type Proof
Classification msc 20F99