Every group is the outer automorphism group of an HNN-extension of a fixed triangle group

Abstract

Fix an equilateral triangle group Ti= a, b; ai, bi, (ab)i with i≥6 arbitrary. Our main result is: for every presentation P of every countable group Q there exists an HNN-extension TP of Ti such that Out(TP) Q. We construct the HNN-extensions explicitly, and examples are given. The class of groups constructed have nice categorical and residual properties. In order to prove our main result we give a method for recognising malnormal subgroups of small cancellation groups, and we introduce the concept of "malcharacteristic" subgroups.