# The isomorphism problem for two-generator one-relator groups with torsion is solvable

@inproceedings{Pride1977TheIP, title={The isomorphism problem for two-generator one-relator groups with torsion is solvable}, author={Stephen J. Pride}, year={1977} }

The theorem stated in the title is obtained by determining (in a sense to be made precise) all the generating pairs of an arbitrary twogenerator one-relator group with torsion. As a consequence of this determination it is also deduced that every two-generator one-relator group G with torsion is Hopfian, and that the automorphism group of G is finitely generated.

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## The outer automorphism groups of two-generator, one-relator groups with torsion

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CITES METHODS & BACKGROUND

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## The JSJ-decompositions of one-relator groups with torsion

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## NIELSEN EQUIVALENCE OF GENERATING PAIRS OF SL(2, q )

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CITES BACKGROUND

## Reflections on the residual finiteness of one-relator groups

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## Two-generated groups acting on trees

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## A quick test for nonisomorphism of one-relator groups

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