Add to ORKGA groupis called metacyclic if it has a cyclic normal subgroup such that the quotient groupis also cyclic. The classification of non-Abelianmetacyclicp-groups of class two has been found by earlier researcher, which is partitioned into two families of non-isomorphic p-groups. The conjugacy classes of these groups are then applied into graph theory. The conjugate graph is a graph whose the vertices are non-central elements of a finite non-Abelian group. Besides, the conjugacy class graph is a graph whose vertices are non-central of a group that is two vertices are connected if their cardinalities are not coprime, in which their greatest common divisor between the vertices is not equal to one. In this study, the conjugacy classes of the metac...
Graphs can be related to groups by looking at its vertices and edges. The vertices are comprised of ...
In this paper, G denotes a non-abelian metabelian group and cl(x) denotes conjugacy class of the ele...
The commutativity degree, defined as the probability that two randomly selected elements of a group ...
In this paper, G denotes a metacyclic 2-group of order at most 32 and ? denotes a simple undirected ...
In this work, a non-abelian metabelian group is represented by G while represents conjugacy class gr...
In this study, the orbits of non abelian metabelian groups of order 26, 28 and 30 are found using co...
Two elements a and b of a group are called conjugate if there exists an element g in the group such ...
In this paper, the conjugacy classes of three metabelian groups, namely the Quasi-dihedral group, Di...
The conjugation degree on a set is the probability that an element of a group fixes a set, whereby t...
In this paper the number of conjugacy classes of for some non-abelian finite groups is computed. Als...
A group G is metacyclic if it contains a cyclic normal subgroup K such that G/K is also cyclic. Meta...
Let G be a metacyclic p-group and Z(G) be its center. The non-commuting graph ΓG of a metacyclic p-g...
There are many possible ways for associating a graph with a group or with a ring, for the purpose of...
In this paper, G denotes a non-abelian metabelian group and cl(x) denotes conjugacy class of the ele...
A conjugacy class is a set of elements in the group under the conjugation action. Meanwhile, a graph...
Graphs can be related to groups by looking at its vertices and edges. The vertices are comprised of ...
In this paper, G denotes a non-abelian metabelian group and cl(x) denotes conjugacy class of the ele...
The commutativity degree, defined as the probability that two randomly selected elements of a group ...
In this paper, G denotes a metacyclic 2-group of order at most 32 and ? denotes a simple undirected ...
In this work, a non-abelian metabelian group is represented by G while represents conjugacy class gr...
In this study, the orbits of non abelian metabelian groups of order 26, 28 and 30 are found using co...
Two elements a and b of a group are called conjugate if there exists an element g in the group such ...
In this paper, the conjugacy classes of three metabelian groups, namely the Quasi-dihedral group, Di...
The conjugation degree on a set is the probability that an element of a group fixes a set, whereby t...
In this paper the number of conjugacy classes of for some non-abelian finite groups is computed. Als...
A group G is metacyclic if it contains a cyclic normal subgroup K such that G/K is also cyclic. Meta...
Let G be a metacyclic p-group and Z(G) be its center. The non-commuting graph ΓG of a metacyclic p-g...
There are many possible ways for associating a graph with a group or with a ring, for the purpose of...
In this paper, G denotes a non-abelian metabelian group and cl(x) denotes conjugacy class of the ele...
A conjugacy class is a set of elements in the group under the conjugation action. Meanwhile, a graph...
Graphs can be related to groups by looking at its vertices and edges. The vertices are comprised of ...
In this paper, G denotes a non-abelian metabelian group and cl(x) denotes conjugacy class of the ele...
The commutativity degree, defined as the probability that two randomly selected elements of a group ...