Add to ORKG535-537The Sadhana polynomial is defined as Sd(G, x)= Ʃc m(G,c).x |E |⁻c where m(G,c) is the number of strips of length c. This new polynomial has been defined to evaluate the Sadhana index of a molecular graph. The relation between this new polynomial and Omega polynomial is investigated. In particular, a method of computing Sadhana polynomial and then Sadhana index for V-phenylenic nanotubes and nanotori with given parameters m and n has been described
Abstract Nanomaterials feature exceptional, one-of-a-kind qualities that might be used in electronic...
Topological indices are numbers related to sub-atomic graphs to allow quantitative structure-movemen...
Let [latex]G=(V;E)[/latex] be a simple connected graph. The Sanskruti index was introduced by Hosama...
Let G be a simple connected graph with the vertex set V = V(G) and the edge set E = E(G), without lo...
The PI polynomial of a molecular graph is defined to be the sum X|E(G)|−N(e) + |V(G)|(|V(G)|+1)...
Structural codes vis-a-vis structural counts, like polynomials of a molecular graph, are important i...
Department of Applied Sciences (Mathematics), Institute of Engineering and Technology. DAVV. Khandw...
Structural codes vis-a-vis structural counts, like polynomials of a molecular graph, are important i...
In this paper, we focus on the structure of Polycyclic Aromatic Hydrocarbons (PAHs) and calculate th...
Abstract A new counting polynomial, called “Omega ” (G, x), was recently proposed by Diudea. It is d...
Graph theory has provided a very useful tool, called topological index, which is a number from the g...
Recently, Hosamani [8], has studied a novel topological index, namely the Sanskruti index S(G) of a ...
Scientists are creating materials, for example, a carbon nanotube-based composite created by NASA th...
The combination of mathematical sciences, physical chemistry, and information sciences leads to a mo...
Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(...
Abstract Nanomaterials feature exceptional, one-of-a-kind qualities that might be used in electronic...
Topological indices are numbers related to sub-atomic graphs to allow quantitative structure-movemen...
Let [latex]G=(V;E)[/latex] be a simple connected graph. The Sanskruti index was introduced by Hosama...
Let G be a simple connected graph with the vertex set V = V(G) and the edge set E = E(G), without lo...
The PI polynomial of a molecular graph is defined to be the sum X|E(G)|−N(e) + |V(G)|(|V(G)|+1)...
Structural codes vis-a-vis structural counts, like polynomials of a molecular graph, are important i...
Department of Applied Sciences (Mathematics), Institute of Engineering and Technology. DAVV. Khandw...
Structural codes vis-a-vis structural counts, like polynomials of a molecular graph, are important i...
In this paper, we focus on the structure of Polycyclic Aromatic Hydrocarbons (PAHs) and calculate th...
Abstract A new counting polynomial, called “Omega ” (G, x), was recently proposed by Diudea. It is d...
Graph theory has provided a very useful tool, called topological index, which is a number from the g...
Recently, Hosamani [8], has studied a novel topological index, namely the Sanskruti index S(G) of a ...
Scientists are creating materials, for example, a carbon nanotube-based composite created by NASA th...
The combination of mathematical sciences, physical chemistry, and information sciences leads to a mo...
Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(...
Abstract Nanomaterials feature exceptional, one-of-a-kind qualities that might be used in electronic...
Topological indices are numbers related to sub-atomic graphs to allow quantitative structure-movemen...
Let [latex]G=(V;E)[/latex] be a simple connected graph. The Sanskruti index was introduced by Hosama...