Establishes a sufficient condition for relatively hierarchically hyperbolic groups to have property (QT) and applies it to residually finite groups in several classes including admissible groups and Artin groups of large type.
Geometry of the complex o f curves. II. Hierarchical structure
2 Pith papers cite this work. Polarity classification is still indexing.
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Outer automorphism groups of one-ended hyperbolic groups are virtually hierarchically hyperbolic under orientability conditions on JSJ decompositions, via bounded central extensions of orbifold mapping class groups, with a sharpness counterexample.
citing papers explorer
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Property (QT) of relatively hierarchically hyperbolic groups
Establishes a sufficient condition for relatively hierarchically hyperbolic groups to have property (QT) and applies it to residually finite groups in several classes including admissible groups and Artin groups of large type.
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Outer automorphism groups of hyperbolic groups, bounded extensions, and hierarchical hyperbolicity
Outer automorphism groups of one-ended hyperbolic groups are virtually hierarchically hyperbolic under orientability conditions on JSJ decompositions, via bounded central extensions of orbifold mapping class groups, with a sharpness counterexample.