Classifying complements for groups. Applications

Abstract

Let A ≤ G be a subgroup of a group G. An A-complement of G is a subgroup H of G such that G = A H and A H = \1\. The classifying complements problem asks for the description and classification of all A-complements of G. We shall give the answer to this problem in three steps. Let H be a given A-complement of G and (, ) the canonical left/right actions associated to the factorization G = A H. To start with, H is deformed to a new A-complement of G, denoted by Hr, using a certain map r: H A called a deformation map of the matched pair (A, H, , ). Then the description of all complements is given: H is an A-complement of G if and only if H is isomorphic to Hr, for some deformation map r: H A. Finally, the classification of complements proves that there exists a bijection between the isomorphism classes of all A-complements of G and a cohomological object D \, (H, A \, | \,(, )). As an application we show that the theoretical formula for computing the number of isomorphism types of all groups of order n arises only from the factorization Sn = Sn-1 Cn.