JOURNAL ARTICLE
The residual finiteness of positive one-relator groups
Year: 2001 Journal: Commentarii Mathematici Helvetici Vol: 76 (2)Pages: 314-338 Publisher: European Mathematical Society
Abstract
It is proven that every positive one-relator group which satisfies the {\rm C}'({1\over6}) condition has a finite index subgroup which splits as a free product of two free groups amalgamating a finitely generated malnormal subgroup. As a consequence, it is shown that every {\rm C}'({1\over6}) positive one-relator group is residually finite. It is shown that positive one-relator groups are generically {\rm C}'({1\over6}) and hence generically residually finite. A new method is given for recognizing malnormal subgroups of free groups. This method employs a 'small cancellation theory' for maps between graphs.
Keywords:
Mathematics Free product Finitely-generated abelian group Combinatorics Free group Group (periodic table) Residual Product (mathematics) Pure mathematics Geometry Algorithm
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26
Cited By
2.20
FWCI (Field Weighted Citation Impact)
18
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0.83
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Citation History
Topics
Geometric and Algebraic Topology
Physical Sciences → Mathematics → Geometry and Topology
Advanced Operator Algebra Research
Physical Sciences → Mathematics → Mathematical Physics
Advanced Topology and Set Theory
Physical Sciences → Mathematics → Geometry and Topology
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