Cyclic complementary extensions and skew-morphisms
Abstract
A cyclic complementary extension of a finite group A is a finite group G which contains A and a cyclic subgroup C such that A C=\1G\ and G=AC. For any fixed generator c of the cyclic factor C= c of order n in a cyclic complementary extension G=AC, the equations cx=(x)c(x), x∈ A, determine a permutation :A A and a function :An on A characterized by the properties: (a) (1A)=1A and (1A)1n; (b) (xy)=(x)(x)(y) and (xy)Σi=1(x)(i-1(y))n, for all x,y∈ A. The permutation is called a skew-morphism of A and has already been extensively studied. One of the main contributions of the present paper is the recognition of the importance of the function , which we call the extended power function associated with . We show that every cyclic complementary extension of A is determined and can be constructed from a skew-morphism of A and an extended power function associated with . As an application, we present a classification of cyclic complementary extensions of cyclic groups obtained using skew-morphisms which are group automorphisms.
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