Pdf Finite Groups Whose Intersection Power Graphs Are Toroidal And

(PDF) Finite Groups Whose Intersection Power Graphs Are Toroidal And ...

(PDF) Finite Groups Whose Intersection Power Graphs Are Toroidal And ... In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective planar. The undirected power graph of a group g, denoted ( g ) , is a simple graph whose vertex set is g and two distinct vertices are adjacent if one is a power of the other.

Perfect Codes In Proper Intersection Power Graphs Of Finite Groups ...

Perfect Codes In Proper Intersection Power Graphs Of Finite Groups ... Gandhigram – 624 302, tamil nadu, india. abstract let g be a group. the intersection graph of subgroups of g, denoted by i (g), is a graph with all the proper subgroups of g as its vertices and two distinct vertices in djacent if and only if the corresponding subgroups having a non trivial intersection in g. in this paper, we classify. Motivated by this question, we finally characterize the groups whose intersection power graphs equal to the power graphs, the enhanced power graphs, the commuting graphs, and the order supergraphs. In this paper, we give a necessary and suficient con dition for a proper intersection power graph to contain a perfect code. as applica tions, we classify all finite nilpotent groups whose proper intersection power graphs admit a perfect code. In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective planar.

(PDF) On The Difference Graph Of Power Graphs Of Finite Groups

(PDF) On The Difference Graph Of Power Graphs Of Finite Groups In this paper, we give a necessary and suficient con dition for a proper intersection power graph to contain a perfect code. as applica tions, we classify all finite nilpotent groups whose proper intersection power graphs admit a perfect code. In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective planar. In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective planar. Groups whose undirected proper power graphs are one of strongly regular, bipartite, planar, or eulerian. later, in [7], doostabedi and far oki have investigated various kinds of planarity, toroidality, and projective planarity of these graphs. an interested reader may refer to t. This paper deals with the classification of groups g such that power graphs and proper power graphs of g are line graphs. in fact, we classify all finite nilpotent groups whose. Article "finite groups whose intersection power graphs are toroidal and projective planar" detailed information of the j global is an information service managed by the japan science and technology agency (hereinafter referred to as "jst").

ATLAS Of Finite Groups: Maximal Subgroups And Ordinary Characters For ...

ATLAS Of Finite Groups: Maximal Subgroups And Ordinary Characters For ... In this paper, we completely classify all finite groups whose intersection power graphs are toroidal and projective planar. Groups whose undirected proper power graphs are one of strongly regular, bipartite, planar, or eulerian. later, in [7], doostabedi and far oki have investigated various kinds of planarity, toroidality, and projective planarity of these graphs. an interested reader may refer to t. This paper deals with the classification of groups g such that power graphs and proper power graphs of g are line graphs. in fact, we classify all finite nilpotent groups whose. Article "finite groups whose intersection power graphs are toroidal and projective planar" detailed information of the j global is an information service managed by the japan science and technology agency (hereinafter referred to as "jst").

SOLUTION: Finite Groups Whose Intersection Power Graphs Are - Studypool

SOLUTION: Finite Groups Whose Intersection Power Graphs Are - Studypool This paper deals with the classification of groups g such that power graphs and proper power graphs of g are line graphs. in fact, we classify all finite nilpotent groups whose. Article "finite groups whose intersection power graphs are toroidal and projective planar" detailed information of the j global is an information service managed by the japan science and technology agency (hereinafter referred to as "jst").

(PDF) Intersection Normal Graphs Of Finite Groups

(PDF) Intersection Normal Graphs Of Finite Groups

Talk 25 On the connectivity of enhanced power graphs of finite groups