Classification of 6-dimensional splittable flat solvmanifolds

Abstract

A flat solvmanifold is a compact quotient G where G is a simply-connected solvable Lie group endowed with a flat left invariant metric and is a lattice of G. Any such Lie group can be written as G=Rkφ Rm with Rm the nilradical. In this article we focus on 6-dimensional splittable flat solvmanifolds, which are obtained quotienting G by a lattice that can be decomposed as =1φ2, where 1 and 2 are lattices of Rk and Rm, respectively. We obtain their classification by analyzing the conjugacy classes of integer matrices of finite order in dimensions 4 and 5.