In this paper, we introduce the modified Revan Sombor index, Revan Sombor exponential and modified Revan Sombor exponential of a graph. We compute the Revan Sombor index, modified Revan Sombor index and their corresponding exponentials of certain nanotubes
Let G be a simple graph with the vertex set V={v1,…,vn} and denote by dvi the degree of the vertex v...
Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(...
535-537The Sadhana polynomial is defined as Sd(G, x)= Ʃc m(G,c).x |E |⁻c where m(G,c) is the number...
In this paper, we introduce the E-Banhatti Sombor index and the modified E-Banhatti Sombor index and...
In this paper, we introduce the modified domination Sombor index and its corresponding exponential o...
Chemical Graph Theory is a branch of Mathematical Chemistry whose focus of interest is to finding to...
In this paper, we introduce the multiplicative modified Revan Sombor index of a graph. Also we compu...
In this paper, we introduce the modified HDR-Sombor index, the HDR Sombor exponential and the modifi...
Recently, Hosamani [8], has studied a novel topological index, namely the Sanskruti index S(G) of a ...
Since 1972, several graph indices were introduced and studied. In this paper, we define the Banhatti...
Let G be a simple molecular graph with vertex set V(G) and edge set E(G) respectively. The degree de...
Topological indices are numbers related to sub-atomic graphs to allow quantitative structure-movemen...
In this paper, we introduce the KG Sombor exponential, modified KG Sombor index, modified KG Sombor...
In this paper we give a GAP program for computing the Szeged and the PI indices of any graph. Also w...
AbstractThe Szeged index of a graph G is defined as Sz(G)=∑e∈E(G)nu(e)nv(e), where nu(e) is the numb...
Let G be a simple graph with the vertex set V={v1,…,vn} and denote by dvi the degree of the vertex v...
Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(...
535-537The Sadhana polynomial is defined as Sd(G, x)= Ʃc m(G,c).x |E |⁻c where m(G,c) is the number...
In this paper, we introduce the E-Banhatti Sombor index and the modified E-Banhatti Sombor index and...
In this paper, we introduce the modified domination Sombor index and its corresponding exponential o...
Chemical Graph Theory is a branch of Mathematical Chemistry whose focus of interest is to finding to...
In this paper, we introduce the multiplicative modified Revan Sombor index of a graph. Also we compu...
In this paper, we introduce the modified HDR-Sombor index, the HDR Sombor exponential and the modifi...
Recently, Hosamani [8], has studied a novel topological index, namely the Sanskruti index S(G) of a ...
Since 1972, several graph indices were introduced and studied. In this paper, we define the Banhatti...
Let G be a simple molecular graph with vertex set V(G) and edge set E(G) respectively. The degree de...
Topological indices are numbers related to sub-atomic graphs to allow quantitative structure-movemen...
In this paper, we introduce the KG Sombor exponential, modified KG Sombor index, modified KG Sombor...
In this paper we give a GAP program for computing the Szeged and the PI indices of any graph. Also w...
AbstractThe Szeged index of a graph G is defined as Sz(G)=∑e∈E(G)nu(e)nv(e), where nu(e) is the numb...
Let G be a simple graph with the vertex set V={v1,…,vn} and denote by dvi the degree of the vertex v...
Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(...
535-537The Sadhana polynomial is defined as Sd(G, x)= Ʃc m(G,c).x |E |⁻c where m(G,c) is the number...
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