Engel conditions in certain groups / Quek Shio Gai
This thesis is a study of certain Engel conditions. First, we will define the set of all the X-relative left Engel elements L(G;X) and the set of all the bounded X-relative left Engel elements L(G;X), where X is a subset of G. When X = G, L(G;X) = L(G) and L(G;X) = L(G), where L(G) is the set of...
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| Format: | Thesis |
| Published: |
2015
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| Online Access: | http://studentsrepo.um.edu.my/6499/1/CD_title.pdf http://studentsrepo.um.edu.my/6499/2/thesis_3_v9.pdf http://studentsrepo.um.edu.my/6499/3/title4a_Front_cover_and_first_page.pdf http://studentsrepo.um.edu.my/6499/4/title4b_Side.pdf http://studentsrepo.um.edu.my/6499/ |
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| Summary: | This thesis is a study of certain Engel conditions. First, we will define the set
of all the X-relative left Engel elements L(G;X) and the set of all the bounded
X-relative left Engel elements L(G;X), where X is a subset of G. When X = G,
L(G;X) = L(G) and L(G;X) = L(G), where L(G) is the set of all the usual left
Engel elements and L(G) is the set of all the usual bounded left Engel elements.
Next, we de�ne the X-relative Hirsch-Plotkin radical HP(G;X) and the X-relative
Baer radical B(G;X). When X = G, HP(G;X) = HP(G) and B(G;X) = B(G)
where HP(G) is the usual Hirsch-Plotkin radical and B(G) is the usual Baer radical.
We will show that if X is a normal solvable subgroup of G, then B(G;X) = L(G;X)
and HP(G;X) = L(G;X). This is an extension of the classical results B(G) = L(G)
and HP(G) = L(G) provided that G is solvable. Next, we show that if X is
a normal subgroup of G and G satis�es the maximal condition, then L(G;X) =
HP(G;X) = B(G;X) = L(G;X), which is also an extension of the classical result
L(G) = HP(G) = B(G) = L(G). We also proved similar results when X is a
subgroup of certain linear groups.
Let G be a group and h; g 2 G. The 2-tuple (h; g) is said to be an n-Engel pair,
n � 2, if h = [h;n g]; g = [g;n h] and h 6= 1. We will show that the subgroup generated
by the 5-Engel pair (x; y) satisfying yxy = xyx and x5 = 1 is the alternating
group A5. Next, we show that if (x; y) is an n-Engel pair, xyx |
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