Congruence solvability in finite Moufang loops of order coprime to three
Abstract
We prove that a normal subloop X of a Moufang loop Q induces an abelian congruence of Q if and only if each inner mapping of Q restricts to an automorphism of X and u(xy) = (uy)x for all x,y∈ X and u∈ Q. The former condition can be omitted when X is 3-divisible. This characterization is then used to show that classically solvable finite 3-divisible Moufang loops are congruence solvable.
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