In this paper we investigate the minimum number of maximal subgroups H_i, i=1,...,k of the symmetric group S_n (or the alternating group A_n) such that each element in the group S_n (respectively A_n) lies in some conjugate of one of the H_i. We prove that this number lies between a*phi(n) and b*n for certain constants a, b, where phi(n) is the Euler phi-function, and we show that the number depends on the arithmetical complexity of n. Moreover in the case where n is divisible by at most two primes, we obtain an upper bound of 2+phi(n)/2, and we determine the exact value for S_n when n is odd and for A_n when n is even.
Normal coverings of finite symmetric and alternating groups / D. Bubboloni; C. Prager. - In: JOURNAL OF COMBINATORIAL THEORY. SERIES A. - ISSN 0097-3165. - STAMPA. - Series A 118:(2011), pp. 2000-2024. [10.1016/j.jcta.2011.03.008]
Normal coverings of finite symmetric and alternating groups
BUBBOLONI, DANIELA;
2011
Abstract
In this paper we investigate the minimum number of maximal subgroups H_i, i=1,...,k of the symmetric group S_n (or the alternating group A_n) such that each element in the group S_n (respectively A_n) lies in some conjugate of one of the H_i. We prove that this number lies between a*phi(n) and b*n for certain constants a, b, where phi(n) is the Euler phi-function, and we show that the number depends on the arithmetical complexity of n. Moreover in the case where n is divisible by at most two primes, we obtain an upper bound of 2+phi(n)/2, and we determine the exact value for S_n when n is odd and for A_n when n is even.
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