Generalised Triangle Groups of Type (2,4,2)

Abstract

A conjecture of Rosenberger says that a group of the form x,y|xp=yq=W(x,y)r=1 (with r>1) is either virtually solvable or contains a non-abelian free subgroup. This note is an account of an attack on the conjecture in the case (p,q,r)=(2,4,2). The results obtained are only partial, but nevertheless provide strong evidence in support of the conjecture in the case in question, in that the word W in any counterexample is shown to satisfy some strong restrictions. The exponent-sums of x and y in W must be even and odd respectively, while its free-product (or syllable) length must be at least 68. There is also a report of computer investigations which yield a stronger lower bound of 196 for the free-product length.

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