Commuting probability for the Sylow subgroups of a finite group
Abstract
For subsets X,Y of a finite group G, let Pr(X,Y) denote the probability that two random elements x∈ X and y∈ Y commute. Obviously, a finite group G is nilpotent if and only if Pr(P,Q)=1 whenever P and Q are Sylow subgroups of G of coprime orders. Suppose that G is a finite group in which for any distinct primes p,q∈π(G) there is a Sylow p-subgroup P and a Sylow q-subgroup Q of G such that Pr(P,Q) ε. We show that F2(G) has ε-bounded index in G. If G is a finite soluble group in which for any prime p∈π(G) there is a Sylow p-subgroup P and a Hall p'-subgroup H such that Pr(P,H) ε, then F(G) has ε-bounded index in G. Moreover, we establish criteria for nilpotency and solubility of G such as: If for any primes p,q∈π(G) the group G has a Sylow p-subgroup P and a Sylow q-subgroup Q with Pr(P,Q)>2/3, then G is nilpotent. If for any primes p,q∈π(G) the group G has a Sylow p-subgroup P and a Sylow q-subgroup Q with Pr(P,Q)>2/5, then G is soluble.
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