Spelling suggestions: "subject:"eie groups : eie algebra"" "subject:"eie groups : iie algebra""
1 |
Problems in Lie rings and groupsGroves, Daniel January 2000 (has links)
We construct a Lie relator which is not an identical Lie relator. This is the first known example of a non-identical Lie relator. Next we consider the existence of torsion in outer commutator groups. Let L be a free Lie ring. Suppose that 1 < i ≤ j ≤ 2i and i ≤ k ≤ i + j + 1. We prove that L/[L<sup>j</sup>, L<sup>i</sup>, L<sup>k</sup><./em>] is torsion free. Also, we prove that if 1 < i ≤ j ≤ 2i and j ≤ k ≤ l ≤ i + j then L/[L<sup>j</sup>, L<sup>i</sup>, L<sup>k</sup>, L<sup>l</sup>] is torsion free. We then prove that the analogous groups, namely F/[γ<sub>j</sub>(F),γ<sub>i</sub>(F),γ<sub>k</sub>(F)] and F/[γ<sub>j</sub>(F),γ<sub>i</sub>(F),γ<sub>k</sub>(F),γ<sub>l</sub>(F)] (under the same conditions for i, j, k and i, j, k, l respectively), are residually nilpotent and torsion free. We prove the existence of 2-torsion in the Lie rings L/[L<sup>j</sup>, L<sup>i</sup>, L<sup>k</sup>] when 1 ≤ k < i,j ≤ 5, and thus show that our methods do not work in these cases. Finally, we consider the order of finite groups of exponent 8. For m ≥ 2, we define the function T(m,n) by T(m,1) = m and T(m,k + 1) = m<sup>T(m,k)</sup>. We prove that if G is a finite m-generator group of exponent 8 then |G| ≤ T(m, 7<sup>471</sup>), improving upon the best previously known bound of T(m, 8<sup>88</sup>).
|
2 |
Symmetric subgroups of automorphism groups of compact simple Lie algebras /Yu, Jun. January 2009 (has links)
Thesis (M.Phil.)--Hong Kong University of Science and Technology, 2009. / Includes bibliographical references (p. 47-48).
|
3 |
Symmetry Representations in the Rigged Hilbert Space Formulation ofSujeewa Wickramasekara, sujeewa@physics.utexas.edu 14 February 2001 (has links)
No description available.
|
4 |
On the Representations of Lie Groups and Lie Algebras in Rigged HilbertSujeewa Wickramasekara, sujeewa@physics.utexas.edu 14 February 2001 (has links)
No description available.
|
5 |
Lie methods in pro-p groupsSnopçe, Ilir. January 2009 (has links)
Thesis (Ph. D.)--State University of New York at Binghamton, Department of Mathematical Sciences, 2009. / Includes bibliographical references.
|
6 |
Lieovy grupy a jejich fyzikální aplikace / Lie groups and their physical applicationsKunz, Daniel January 2020 (has links)
In this thesis I describe construction of Lie group and Lie algebra and its following usage for physical problems. To be able to construct Lie groups and Lie algebras we need define basic terms such as topological manifold, tensor algebra and differential geometry. First part of my thesis is aimed on this topic. In second part I am dealing with construction of Lie groups and algebras. Furthermore, I am showing different properties of given structures. Next I am trying to show, that there exists some connection among Lie groups and Lie algebras. In last part of this thesis is used just for showing how this apparat can be used on physical problems. Best known usage is to find physical symmetries to establish conservation laws, all thanks to famous Noether theorem.
|
Page generated in 0.0631 seconds