Artin transfer patterns on descendant trees of finite p-groups

Abstract

Based on a thorough theory of the Artin transfer homomorphism \(TG,H:\,G H/H\) from a group \(G\) to the abelianization \(H/H\) of a subgroup \(H G\) of finite index \(n=(G:H)\), and its connection with the permutation representation \(G Sn\) and the monomial representation \(G H Sn\) of \(G\), the Artin pattern \(G(τ(G),(G))\), which consists of families \(τ(G)=(H/H)H G\), resp. \((G)=((TG,H))H G\), of transfer targets, resp. transfer kernels, is defined for the vertices \(G∈T\) of any descendant tree \(T\) of finite \(p\)-groups. It is endowed with partial order relations \(τ(π(G))τ(G)\) and \((π(G))(G)\), which are compatible with the parent-descendant relation \(π(G)<G\) of the edges \(Gπ(G)\) of the tree \(T\). The partial order enables termination criteria for the \(p\)-group generation algorithm which can be used for searching and identifying a finite \(p\)-group \(G\), whose Artin pattern \((τ(G),(G))\) is known completely or at least partially, by constructing the descendant tree with the abelianization \(G/G\) of \(G\) as its root. An appendix summarizes details concerning induced homomorphisms between quotient groups, which play a crucial role in establishing the natural partial order on Artin patterns \((τ(G),(G))\) and explaining the stabilization, resp. polarization, of their components in descendant trees \(T\) of finite \(p\)-groups.