Automorphisms and monomorphisms of direct products of virtually solvable minimax groups

Abstract

This paper studies automorphisms and monomorphisms of direct products =1×·s×r of finitely generated virtually solvable minimax groups, a class containing all virtually polycyclic groups. Under an indecomposability assumption on the Q-algebraic hulls, we prove that every monomorphism of factorizes uniquely as =θ·ζ, where θ sends each factor into a permuted factor with Q-isomorphic hull and ζ is central and off-diagonal. Conversely, every such pair defines a monomorphism of , and is an automorphism if and only if θ is. This indecomposability assumption is sharp: we show it cannot be weakened to direct indecomposability of the factors. The proof proceeds in three steps: first by establishing the corresponding central mixing property for finite-dimensional Lie algebras and algebraic Lie algebras, then for connected linear algebraic groups, and finally by transferring these results to minimax groups via Q-algebraic hulls. This extends the previously known nilpotent case both from automorphisms to monomorphisms and from finitely generated torsion-free nilpotent groups to the broader class of finitely generated virtually solvable minimax groups. As applications, we characterize co-Hopfian direct products and derive formulas for Reidemeister numbers and Reidemeister spectra.