2018
DOI: 10.1090/tran/7593
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On the uniform domination number of a finite simple group

Abstract: Let G be a finite simple group. By a theorem of Guralnick and Kantor, G contains a conjugacy class C such that for each non-identity element x ∈ G, there exists y ∈ C with G = x, y . Building on this deep result, we introduce a new invariant γu(G), which we call the uniform domination number of G. This is the minimal size of a subset S of conjugate elements such that for each 1 = x ∈ G, there exists s ∈ S with G = x, s . (This invariant is closely related to the total domination number of the generating graph … Show more

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Cited by 16 publications
(50 citation statements)
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References 44 publications
(137 reference statements)
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“…In each of the remaining cases, we can find an element in G of order r that is contained in a unique maximal subgroup H, where r and H are given below. To see this, we refer the reader to [9, Table 1], noting the correction µ(G) = 1 for G = Th since the same computational approach implemented in the proof of [9,Theorem 4.1] shows that elements of order 39 are indeed contained in a unique maximal subgroup. Then by inspecting [11] we see that b(G, H) = 2 in each case and this allows us to conclude via Lemma 2.6.…”
Section: Sporadic Groupsmentioning
confidence: 99%
See 2 more Smart Citations
“…In each of the remaining cases, we can find an element in G of order r that is contained in a unique maximal subgroup H, where r and H are given below. To see this, we refer the reader to [9, Table 1], noting the correction µ(G) = 1 for G = Th since the same computational approach implemented in the proof of [9,Theorem 4.1] shows that elements of order 39 are indeed contained in a unique maximal subgroup. Then by inspecting [11] we see that b(G, H) = 2 in each case and this allows us to conclude via Lemma 2.6.…”
Section: Sporadic Groupsmentioning
confidence: 99%
“…Proof. Following [9], let γ u (G) be the uniform domination number of G. This is defined to be the minimal size of a set of conjugate elements {x 1 , . .…”
Section: It Remains To Verify the Bound δ S (G)mentioning
confidence: 99%
See 1 more Smart Citation
“…It is therefore natural to ask the following. Following [14], a subset S ⊆ G is a total dominating set for G if for all x ∈ G there exists y ∈ S such that x, y = G. Therefore, u(G) > 0 if and only if G has a total dominating set consisting of conjugate elements, a so-called uniform dominating set.…”
Section: Questionsmentioning
confidence: 99%
“…If there is a set X such that s X (G) 1, then X is called a total dominating set of G. We can then define the uniform spread of G as the supremum of {s C (G) : C a conjugacy class of G}, and denote this by u(G). The concept of uniform spread was introduced in [4]; both [7,8] provide further interesting results for finite groups. Note that u(G) s(G) by definition.…”
Section: Introductionmentioning
confidence: 99%