Cubic maps from the group of order 3
Abstract
The purpose of this note is to classify unital cubic maps from the cyclic group of order 3 into an arbitrary non-abelian group. We show that the universal group admitting a unital cubic map from the cyclic group of order 3 is infinite, give a concrete presentation and provide an infinite representation of it in PSL3( C), whose image is an arithmetic lattice commensurable with PSL3( Z[ω]), where ω is a primitive cube root of unity. As a consequence we obtain the existence of finite nilpotent groups of arbitrarily large nilpotency class admitting a unital cubic map from C3 whose image generates the group.
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