TY - JOUR
T1 - A Counter Example For Neighbourhood Number Less Than Edge Covering Number Of a Graph
AU - Bhat, Surekha Ravi shankar
AU - Bhat, Ravi shankar
AU - Bhat, Smitha Ganesh
AU - Vinayaka, Sayinath Udupa Nagara
N1 - Publisher Copyright:
© 2022. IAENG International Journal of Applied Mathematics.All Rights Reserved
PY - 2022
Y1 - 2022
N2 - The open neighbourhood N(v) of a vertex v 2 V; is the set of all vertices adjacent to v. Then N[v] = N(v)[fvg is called the enclave of v. We say that a vertex v 2 V, n-covers an edge x ∈ X if x ∈ {N[v]i}, the subgraph induced by the set N[v]. The n-covering number pn(G) introduced by Sampathkumar and Neeralagi [18] is the minimum number of vertices needed to n-cover all the edges of G. In this paper one of the results proved in [18] is disproved by exhibiting an infinite class of graphs as counter example. Further, an expression for number of triangles in any graph is established. In addition, the properties of clique regular graphs has been studied.
AB - The open neighbourhood N(v) of a vertex v 2 V; is the set of all vertices adjacent to v. Then N[v] = N(v)[fvg is called the enclave of v. We say that a vertex v 2 V, n-covers an edge x ∈ X if x ∈ {N[v]i}, the subgraph induced by the set N[v]. The n-covering number pn(G) introduced by Sampathkumar and Neeralagi [18] is the minimum number of vertices needed to n-cover all the edges of G. In this paper one of the results proved in [18] is disproved by exhibiting an infinite class of graphs as counter example. Further, an expression for number of triangles in any graph is established. In addition, the properties of clique regular graphs has been studied.
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M3 - Article
AN - SCOPUS:85131097350
SN - 1992-9978
VL - 52
JO - IAENG International Journal of Applied Mathematics
JF - IAENG International Journal of Applied Mathematics
IS - 2
M1 - IJAM_52_2_29
ER -