ALMOST ABELIAN LIE GROUPS, SUBGROUPS AND QUOTIENTS

• Published in: Journal of mathematical sciences (New York, N.Y.) Vol. 266; no. 1; pp. 42 - 65
• Main Authors: Rios, Marcelo Almora, Avetisyan, Zhirayr, Berlow, Katalin, Martin, Isaac, Rakholia, Gautam, Yang, Kelley, Zhang, Hanwen, Zhao, Zishuo
• Format: Journal Article
• Language: English
• Published: Cham Springer International Publishing 01.09.2022; Springer Nature B.V
• Subjects: Anisotropic media; Automorphisms; Cosmology; Crystallography; Differential geometry; Lie groups; Mathematics; Mathematics and Statistics; Matrix representation; Quotients; Subgroups; Theoretical physics
• ISSN: 1072-3374; 1573-8795
• DOI: 10.1007/s10958-022-05872-2

An almost Abelian Lie group is a non-Abelian Lie group with a codimension 1 Abelian normal subgroup. The majority of 3-dimensional real Lie groups are almost Abelian, and they appear in all parts of physics that deal with anisotropic media—cosmology, crystallography etc. In theoretical physics and differential geometry, almost Abelian Lie groups and their homogeneous spaces provide some of the simplest solvmanifolds on which a variety of geometric structures, such as symplectic, Kähler, spin etc., are currently studied in explicit terms. Recently, almost Abelian Lie algebras were classified and studied in details. However, a systematic investigation of almost Abelian Lie groups has not been carried out yet, and the present paper is devoted to an explicit description of properties of this wide and diverse class of groups. The subject of investigation are real almost Abelian Lie groups with their Lie group theoretical aspects, such as the exponential map, faithful matrix representations, discrete and connected subgroups, quotients and automorphisms. The emphasis is put on explicit description of all technical details.