Buch, Deutsch, 200 Seiten, Format (B × H): 190 mm x 270 mm, Gewicht: 495 g
With 224 exercises
Buch, Deutsch, 200 Seiten, Format (B × H): 190 mm x 270 mm, Gewicht: 495 g
ISBN: 978-3-95935-594-0
Verlag: Disserta Verlag
Within this work we study the structure of the Solomon-Tits algebra of the symmetric group motivated by results of research done by Manfred Schocker about the module structure of this algebra. We investigate three structures: the associative, the associated Lie algebra and the group of units. All three structures are related and can be studied in the more general context of associative soluble splittable algebras possessing a self-centralizing radical complement. Our results are related to dimension formulas, Duo algebras, self-centralization of the radical complements, Cartan subalgebras, Sylow subgroups, Hall subgroups, Carter subgroups, stagnation of central chains, classes of nilpotency and solvability, exponents alongside central chains, nilradical and Fitting subgroup, semisimple and simple substructures, anti-automoprhism and irreducible character values.
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Chapter Introduction:
[…] The importance of Solomons algebra for several combinatorial and algebraical contexts is one cause for Thorsten Bauer to study within his thesis [3] the algebraical structure of Solomons algebra in characteristic zero. Again, one main insight for his study is the description of a second and suitable linear basis. Among other things he describes the stagnation of the ascending and descending Lie-central chains, its derivations and algebra automorphism, the Carter subgroups of its group of units and the Cartan subalgebras of ist associated Lie algebra. The latter ones are studied in a more general context of finite-dimensional associative soluble algebras. Both structures are connected, too: the Carter subgroups are the group of units of the Cartan subalgebras. The research of Thorsten Bauer for Solomons algebra are an additional motivation for me to study the structure of the Solomon-Tits algebra.
The study within this work is done based on the following questions:
- Is it possible to generalize the results of Thorsten Bauer and to apply them to the Solomon-Tits algebra?
- Do more connections between the group of units and the Lie algebra4 of an associative soluble algebra exist?
- What are insights about the associative structure, the group-theoretical structure of the group of units and the Lie algebra structure of the associated Lie algebra of Solomon-Tits algebra?
- Is it possible to apply the results to Solomons algebra?
These questions will not be answered completely within this work but they are the guidelines for our research. Now we present our results and the meaning of self-centralizing radical complements is highlighted as a more general context for studying our guidelines.
