Finite groups with an affine map of large order

Abstract

Let G be a group. A function G→ G of the form x xαg for a fixed automorphism α of G and a fixed g∈ G is called an affine map of G. In this paper, we study finite groups G with an affine map of large order. More precisely, we show that if G admits an affine map of order larger than 12|G|, then G is solvable of derived length at most 3. We also show that more generally, for each ∈(0,1], if G admits an affine map of order at least |G|, then the largest solvable normal subgroup of G has derived length at most 42(-1)+3.