tailieunhanh - Báo cáo toán học: "nX-Complementary Generations of the Rudvalis Group Ru Ali Reza Ashrafi1 and Ali Iranmanesh2"

G là một nhóm hữu hạn và NX một lớp conjugacy của các yếu tố của n trật tự trong G. G được gọi là NX-bổ sung tạo ra nếu, đối với mỗi x ∈ G - {1}, có ay ∈ NX như vậy mà G =. [20] câu hỏi về việc tìm kiếm tất cả các số nguyên dương n được không abelian hữu hạn đơn giản nhóm G là NX. | Vietnam Journal of Mathematics 33 1 2005 1-7 V Í e It ini ai m J o mt r im ai I of MATHEMATICS VAST 2005 nX-Complementary Generations of the Rudvalis Group Ru Ali Reza Ashrafi1 and Ali Iranmanesh2 1 Department of Mathematics Faculty of Science University of Kashan Kashan Iran 2 Department of Mathematics Tarbiat Modarres University 14115-137 Tehran Iran Received March 19 2003 Revised October 17 2004 Abstract Let be a finite group and a conjugacy class of elements of order in . is called complementary generated if for every. there is a such that. In 20 the question of finding all positive integers such that a given non-abelian finite simple group is -complementary generated was posed. In this paper we answer this question for the sporadic group . In fact we prove that for any element order of the sporadic group is -complementary generated if and only if . . . 1. Introduction 3 . . . A 5 7 m 7 m 2 g h g h Ali Reza Ashrafi and Ali Iranmanesh 3 2 22 . 1 2 3 2. . . . Lemma . If is -complementary generated and for some integer then is -complementary generated. Lemma . .Let be a 2 -generated. -generated simple group then is Lemma . Let be a finite simple group and a maximal subgroup of containing a fixed element . Then the number of conjugates of containing is . where . is the permutation character of with action on the -Complementary Generations of the Rudvalis Group 3 conjugates of .In particular . G 1 where 1 2. are representatives of the -conjugacy classes that fuse to the -conjugacy class of Theorem. The Rudvalis group is -complementary generated if and only if 3. 2. -Complementary Generations for . Table 1. .4. . 22. 3. 2 2. 2 29 . 2 2. .5 . 28. 2 2. 3. . 22 . 2 3. 23 .3 3 24 . 26 U3. 23 8 L3 2 6 -5 . 8 .2 5 .1 2 2 5 2 . 2 3. 214 .3. 214 .3. 2 2. . 3 25. 3 .