Please use this identifier to cite or link to this item: http://10.9.150.37:8080/dspace//handle/atmiyauni/1995
Title: METRIC DIMENSION OF GRAPHS OBTAINED FROM COMMUTATIVE RING
Authors: VAIDYA, S
JADEJA, M
Keywords: Commutative ring
intersection graph; annihilator ideal graph
metric dimension
Issue Date: 2022
Publisher: Advances and Applications in Mathematical Sciences
Citation: VAIDYA, S., & JADEJA, M. (2022). METRIC DIMENSION OF GRAPHS OBTAINED FROM COMMUTATIVE RING.
Abstract: For a connected graph of order n, the metric basis of a G is a smallest set {} k v vv S,,, 2 =1 of vertices of G such that for vertex, G u∈ the ordered k-tuples of are all distinct.distances {()()()()} k vud vud vud vud,,,,,,,, 3 2 1 The metric dimension of G, denoted as (), dim G is the cardinality of a metric basis for G. In the present work we investigate metric dimension of intersection graphs and annihilator ideal graphs of commutative ring R
URI: http://10.9.150.37:8080/dspace//handle/atmiyauni/1995
Appears in Collections:01. Journal Articles

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