Deprecated: $wgMWOAuthSharedUserIDs=false is deprecated, set $wgMWOAuthSharedUserIDs=true, $wgMWOAuthSharedUserSource='local' instead [Called from MediaWiki\HookContainer\HookContainer::run in /var/www/html/w/includes/HookContainer/HookContainer.php at line 135] in /var/www/html/w/includes/Debug/MWDebug.php on line 372
On the rank of quotients of hyperbolic groups. - MaRDI portal

On the rank of quotients of hyperbolic groups. (Q2873306)

From MaRDI portal





scientific article; zbMATH DE number 6249745
Language Label Description Also known as
English
On the rank of quotients of hyperbolic groups.
scientific article; zbMATH DE number 6249745

    Statements

    0 references
    23 January 2014
    0 references
    hyperbolic groups
    0 references
    Dehn fillings
    0 references
    hyperbolic 3-manifolds
    0 references
    quasi-convex subgroups
    0 references
    small cancellation theory
    0 references
    finitely generated subgroups
    0 references
    On the rank of quotients of hyperbolic groups. (English)
    0 references
    Let \(G\) be a hyperbolic group with finite generating set \(X\) such that the Cayley graph \(\Gamma(G,X)\) is \(\delta\)-hyperbolic. A subgroup \(U\) is called `quasi-convex', if there exists a constant \(C\) such that for all \(x,y\in U\), the geodesic connecting \(x\) and \(y\) in \(\Gamma(G,X)\) is contained completely in the \(C\)-neighborhood of \(U\). In this article, the hyperbolic group \(G\) is assumed to be torsion free with rank \(n\). It is also assumed that all \(n\)-generated subgroups of \(G\) are quasi-convex. Using methods of small cancellation theory, it is proved that for every element \(g\in G\), there exists a sufficiently large power \(N\) such that the rank of the quotient group \(G/\langle\langle g^N\rangle\rangle\) is again \(n\).
    0 references

    Identifiers

    0 references
    0 references
    0 references
    0 references
    0 references
    0 references
    0 references