Add to ORKGA subset of vertices of a simple connected graph is a neighborhood set (n-set) of G if G is the union of subgraphs of G induced by the closed neighbors of elements in S. Further, a set S is a resolving set of G if for each pair of distinct vertices x,y of G, there is a vertex s∈ S such that d(s,x)≠d(s,y). An n-set that serves as a resolving set for G is called an nr-set of G. The nr-set with least cardinality is called an nr-metric basis of G and its cardinality is called the neighborhood metric dimension of graph G. In this paper, we characterize graphs of neighborhood metric dimension two
Abstract: A graph G = (V, E) is a non-empty collection of vertices and edges, where V is the vertex ...
As a generalization of the concept of a metric basis, this article introduces the notion of k-metric...
Let G be a simple, nontrivial, and connected graph. is a representation of an ordered set of k dist...
Let G=(V,E) be a simple connected graph. A subset S of V is called a neighbourhood set of G if $G=\b...
A vertex X in a connected graph G is said to resolve a pair {u,v} of vertices of G if the distance f...
AbstractA vertex x in a connected graph G is said to resolve a pair {u,v} of vertices of G if the di...
For an ordered subset W = {w1, w2, . . . , wk} of vertices in a connected graph G and a vertex v of ...
Let G=(V,E) be a simple connected graph. A subset S of V is called a neighbourhood set of G if $G=\b...
In this paper, we define distance partition of vertex set of a graph G with reference to a vertex in...
Let G = ( V ( G ) , E ( G ) ) be a connected graph. An ordered set W ⊂ V ( G ) i...
The distance d(va,vb) between two vertices of a simple connected graph G is the length of the shorte...
The distance d(va,vb) between two vertices of a simple connected graph G is the length of the shorte...
The concept of minimum resolving set has proved to be useful and or related to a variety of fields s...
A resolving set is a set W of vertices of a connected graph G(V, E) such that for every pair of vert...
Let G be a connected graph. Given an ordered set W = {w1, . . . , wk} ⊆ V (G) and a vertex u ∈ V (G)...
Abstract: A graph G = (V, E) is a non-empty collection of vertices and edges, where V is the vertex ...
As a generalization of the concept of a metric basis, this article introduces the notion of k-metric...
Let G be a simple, nontrivial, and connected graph. is a representation of an ordered set of k dist...
Let G=(V,E) be a simple connected graph. A subset S of V is called a neighbourhood set of G if $G=\b...
A vertex X in a connected graph G is said to resolve a pair {u,v} of vertices of G if the distance f...
AbstractA vertex x in a connected graph G is said to resolve a pair {u,v} of vertices of G if the di...
For an ordered subset W = {w1, w2, . . . , wk} of vertices in a connected graph G and a vertex v of ...
Let G=(V,E) be a simple connected graph. A subset S of V is called a neighbourhood set of G if $G=\b...
In this paper, we define distance partition of vertex set of a graph G with reference to a vertex in...
Let G = ( V ( G ) , E ( G ) ) be a connected graph. An ordered set W ⊂ V ( G ) i...
The distance d(va,vb) between two vertices of a simple connected graph G is the length of the shorte...
The distance d(va,vb) between two vertices of a simple connected graph G is the length of the shorte...
The concept of minimum resolving set has proved to be useful and or related to a variety of fields s...
A resolving set is a set W of vertices of a connected graph G(V, E) such that for every pair of vert...
Let G be a connected graph. Given an ordered set W = {w1, . . . , wk} ⊆ V (G) and a vertex u ∈ V (G)...
Abstract: A graph G = (V, E) is a non-empty collection of vertices and edges, where V is the vertex ...
As a generalization of the concept of a metric basis, this article introduces the notion of k-metric...
Let G be a simple, nontrivial, and connected graph. is a representation of an ordered set of k dist...