Solvable normal subgroups of 2-knot groups
Abstract
If X is an orientable, strongly minimal PD4-complex and π1(X) has one end then it has no nontrivial locally-finite normal subgroup. Hence if π is a 2-knot group then (a) if π is virtually solvable then either π has two ends or π, with presentation a,t|ta=a2t, or π is torsion-free and polycyclic of Hirsch length 4; (b) either π has two ends, or π has one end and the centre ζπ is torsion-free, or π has infinitely many ends and ζπ is finite; and (c) the Hirsch-Plotkin radical π is nilpotent.
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