Let G be a group and H any subgroup of G. The commutativity degree of a finite group G is defined as the probability that a pair of elements x and y, chosen randomly from a group G, commute. The concept of commutativity degree has been extended to the relative commutativity degree of a subgroup H, which is defined as the probability that a random element of a subgroup, H commutes with another random element of a group G. This research extends the concept of relative commutativity degree to the multiplicative degree of a group G, which is defined as the probability that the product of a pair of elements x, y chosen randomly from a group G, is in H. This research focuses on some dihedral groups
We show some results on the probability that a randomly picked pair (H;K) of subgroups of a nite gro...
A group G is metabelian if and only if there exists an abelian normal subgroup, A such that the fact...
Studying the properties of groups based on some probabilistic methods is an appealing branch of rese...
The commutativity degree of a finite group G was introduced by Erdos and Turan for symmetric groups,...
The commutativity degree of a group is the probability that two randomly chosen elements of G commut...
Let G be a finite group. The commutativity degree of a group is the probability that a random pair o...
Let G be a finite dihedral group Dn. The probability that two random elements commute is called the ...
The commutativity degree of a finite group G is the probability that two randomly chosen elements of...
The commutativity degree of a finite group is the probability that two randomly chosen group element...
Let G be a finite group and n a positive integer. The n-th commutativity degree P-n(G) of G is the p...
The commutativity degree of a finite group is the probability that a random pair of elements in the ...
Abstract. For a finite group G and a subgroup H of G, the rel-ative commutativity degree of H in G, ...
The degree of commutativity of a group G measures the probability of choosing two elements in G whic...
Abstract. Let G be a finite group and let C = {(x, y) ∈ G×G | xy = yx}. Then Pr(G) = |C|/|G|2 is t...
Abstract. Let 퐺 be a finite group and let 풞 = {(푥, 푦) ∈ 퐺 × 퐺 ∣ 푥 푦 = 푦푥}. Then Pr(퐺) = ∣풞∣/...
We show some results on the probability that a randomly picked pair (H;K) of subgroups of a nite gro...
A group G is metabelian if and only if there exists an abelian normal subgroup, A such that the fact...
Studying the properties of groups based on some probabilistic methods is an appealing branch of rese...
The commutativity degree of a finite group G was introduced by Erdos and Turan for symmetric groups,...
The commutativity degree of a group is the probability that two randomly chosen elements of G commut...
Let G be a finite group. The commutativity degree of a group is the probability that a random pair o...
Let G be a finite dihedral group Dn. The probability that two random elements commute is called the ...
The commutativity degree of a finite group G is the probability that two randomly chosen elements of...
The commutativity degree of a finite group is the probability that two randomly chosen group element...
Let G be a finite group and n a positive integer. The n-th commutativity degree P-n(G) of G is the p...
The commutativity degree of a finite group is the probability that a random pair of elements in the ...
Abstract. For a finite group G and a subgroup H of G, the rel-ative commutativity degree of H in G, ...
The degree of commutativity of a group G measures the probability of choosing two elements in G whic...
Abstract. Let G be a finite group and let C = {(x, y) ∈ G×G | xy = yx}. Then Pr(G) = |C|/|G|2 is t...
Abstract. Let 퐺 be a finite group and let 풞 = {(푥, 푦) ∈ 퐺 × 퐺 ∣ 푥 푦 = 푦푥}. Then Pr(퐺) = ∣풞∣/...
We show some results on the probability that a randomly picked pair (H;K) of subgroups of a nite gro...
A group G is metabelian if and only if there exists an abelian normal subgroup, A such that the fact...
Studying the properties of groups based on some probabilistic methods is an appealing branch of rese...