On the multiplication groups of three-dimensional topological loops

Abstract

We clarify the structure of nilpotent Lie groups which are multiplication groups of 3-dimensional simply connected topological loops and prove that non-solvable Lie groups acting minimally on 3-dimensional manifolds cannot be the multiplication group of 3-dimensional topological loops. Among the nilpotent Lie groups for any filiform groups Fn+2 and Fm+2 with n, m > 1, the direct product Fn+2 × R and the direct product Fn+2 × Z Fm+2 with amalgamated center Z occur as the multiplication group of 3-dimensional topological loops. To obtain this result we classify all 3-dimensional simply connected topological loops having a 4-dimensional nilpotent Lie group as the group topologically generated by the left translations.