The commuting graph C(G,X), where G is a group and X is a subset of G, is the graph with vertex set X and distinct vertices being joined by an edge whenever they commute. Here the diameter of C(G,X) is studied when G is a symmetric group and X a conjugacy class of elements of order 3
There are many possible ways for associating a graph with a group or with a ring, for the purpose of...
We associate to every finite group G a graph F'(G) related to the conjugacy classes of G, and d...
For a group G and X a subset of G, the commuting graph of G on X, denoted by C(G,X), is the graph wh...
The commuting graph $\mathcal{C}(G,X)$, where $G$ is a group and $X$ is a subset of $G$, is the grap...
The commuting graph C (G, X), where G is a finite group and X is a subset of G, is the graph whose v...
A commuting graph is a graph denoted by C(G,X) where G is any group and X, a subset of a group G, is...
The commuting graph C(G, X), where G is a finite group and X is a subset of G, is the graph whose ve...
Suppose G be a finite group and X be a subset of G. The commuting graph, denoted by C(G,X), is a sim...
{{The} commuting graph of a group $G$ is an undirected graph whose vertices arenon-central elements ...
The commuting graph of a group $G$ is an undirected graph whose vertices are non-central elements of...
For a group G and X a subset of G the commuting graph of G on X, denoted by C(G,X), is the graph who...
AbstractA necessary and sufficient condition is proven for the connectivity of commuting graphs C(G,...
Let G be a finite group and T3(G) be the set of third power of commuting element in G i.e T3(G) = {...
The commuting graph C(G;X) , where G is a group and X a subset of G, has X as its vertex set with tw...
The commuting graph of a finite non-commutative semigroup S, denoted G(S), is a simple graph whose v...
There are many possible ways for associating a graph with a group or with a ring, for the purpose of...
We associate to every finite group G a graph F'(G) related to the conjugacy classes of G, and d...
For a group G and X a subset of G, the commuting graph of G on X, denoted by C(G,X), is the graph wh...
The commuting graph $\mathcal{C}(G,X)$, where $G$ is a group and $X$ is a subset of $G$, is the grap...
The commuting graph C (G, X), where G is a finite group and X is a subset of G, is the graph whose v...
A commuting graph is a graph denoted by C(G,X) where G is any group and X, a subset of a group G, is...
The commuting graph C(G, X), where G is a finite group and X is a subset of G, is the graph whose ve...
Suppose G be a finite group and X be a subset of G. The commuting graph, denoted by C(G,X), is a sim...
{{The} commuting graph of a group $G$ is an undirected graph whose vertices arenon-central elements ...
The commuting graph of a group $G$ is an undirected graph whose vertices are non-central elements of...
For a group G and X a subset of G the commuting graph of G on X, denoted by C(G,X), is the graph who...
AbstractA necessary and sufficient condition is proven for the connectivity of commuting graphs C(G,...
Let G be a finite group and T3(G) be the set of third power of commuting element in G i.e T3(G) = {...
The commuting graph C(G;X) , where G is a group and X a subset of G, has X as its vertex set with tw...
The commuting graph of a finite non-commutative semigroup S, denoted G(S), is a simple graph whose v...
There are many possible ways for associating a graph with a group or with a ring, for the purpose of...
We associate to every finite group G a graph F'(G) related to the conjugacy classes of G, and d...
For a group G and X a subset of G, the commuting graph of G on X, denoted by C(G,X), is the graph wh...