Topological loops with solvable multiplication groups of dimension at most six are centrally nilpotent

Abstract

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The main result of our consideration is the proof of the centrally nilpotency of class two property for connected topological proper loops $L$ of dimension $\le 3$ which have an at most six-dimensional solvable indecomposable Lie group as their multiplication group. This theorem is obtained from our previous classification by the investigation of six-dimensional indecomposable solvable multiplication Lie groups having a five-dimensional nilradical. We determine the Lie algebras of these multiplication groups and the subalgebras of the corresponding inner mapping groups.

Keywords

• multiplication group and inner mapping group of topological loops
• topological transformation group
• solvable lie algebras
• centrally nilpotent loops