The Extrinsic Primitive Torsion Problem
Abstract
Let Pk be the subgroup generated by kth powers of primitive elements in Fr, the free group of rank r. We show that F2/Pk is finite if and only if k is 1, 2, or 3. We also fully characterize F2/Pk for k = 2,3,4. In particular, we give a faithful nine dimensional representation of F2/P4 with infinite image.
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