Add to ORKGThe Padmakar–Ivan (PI) index of a graph G is defined as PI(G) = ∑[n eu (e|G)+ n ev (e|G)], where n eu (e|G) is the number of edges of G lying closer to u than to v, n ev (e|G) is the number of edges of G lying closer to v than to u and summation goes over all edges of G. In this paper, we first compute the PI index of a class of pericondensed benzenoid graphs consisting of n rows, n ≤ 3, of hexagons of various lengths. Finally, we prove that for any connected graph G with exactly m edges, PI(G) ≤ m(m-1) with equality if and only if G is an acyclic graph or a cycle of odd length
AbstractRecently the vertex Padmakar–Ivan (PIv) index of a graph G was introduced as the sum over al...
Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges. We de...
Let G be a molecular graph, a topological index is a numeric quantity related to G which is invarian...
The Padmakar–Ivan (PI) index is a graph invariant defined as the summation of the sums of n eu (e|G)...
AbstractThe PI index is a graph invariant defined as the summation of the sums of neu(e|G) and nev(e...
The Padmakar-Ivan (PI) index of a graph G is defined as PI (G) = Σ [neu(e|G)+nev(e|G)], where for ed...
AbstractThe Padmakar–Ivan (PI) index of a graph G is the sum over all edges uv of G of the number of...
Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges. We de...
Counting polynomials are important graph invariants whose coefficients and exponents are related to ...
AbstractThe vertex Padmakar–Ivan (PI) index of a graph G is the sum over all edges uv∈E(G) of the nu...
PI index is an edge-additive topological index introduced as a counterpart to the vertex-multiplicat...
A characteristic graph is a tree representative of its corresponding benzenoid (cyclic) graph. It ma...
AbstractA graph invariant I(G) of a connected graph G=(V,E) contributed by the weights of all edges ...
Omega polynomial was defined by M.V. Diudea in 2006 as  where the number of edges co-distant w...
Department of Mathematics, Statistics and Computer Science, Faculty of Science, University of Kashan...
AbstractRecently the vertex Padmakar–Ivan (PIv) index of a graph G was introduced as the sum over al...
Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges. We de...
Let G be a molecular graph, a topological index is a numeric quantity related to G which is invarian...
The Padmakar–Ivan (PI) index is a graph invariant defined as the summation of the sums of n eu (e|G)...
AbstractThe PI index is a graph invariant defined as the summation of the sums of neu(e|G) and nev(e...
The Padmakar-Ivan (PI) index of a graph G is defined as PI (G) = Σ [neu(e|G)+nev(e|G)], where for ed...
AbstractThe Padmakar–Ivan (PI) index of a graph G is the sum over all edges uv of G of the number of...
Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges. We de...
Counting polynomials are important graph invariants whose coefficients and exponents are related to ...
AbstractThe vertex Padmakar–Ivan (PI) index of a graph G is the sum over all edges uv∈E(G) of the nu...
PI index is an edge-additive topological index introduced as a counterpart to the vertex-multiplicat...
A characteristic graph is a tree representative of its corresponding benzenoid (cyclic) graph. It ma...
AbstractA graph invariant I(G) of a connected graph G=(V,E) contributed by the weights of all edges ...
Omega polynomial was defined by M.V. Diudea in 2006 as  where the number of edges co-distant w...
Department of Mathematics, Statistics and Computer Science, Faculty of Science, University of Kashan...
AbstractRecently the vertex Padmakar–Ivan (PIv) index of a graph G was introduced as the sum over al...
Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges. We de...
Let G be a molecular graph, a topological index is a numeric quantity related to G which is invarian...