Multiset and Mixed Metric Dimension for Starphene and Zigzag-Edge Coronoid
Abstract
Let =(V,E) be a simple connected graph. A vertex a is said to recognize (resolve) two different elements b1 and b2 from V() E() if d(a, b1)≠ d(a, b2\. A subset of distinct ordered vertices UM⊂eq V() is said to be a mixed metric generator for if each pair of distinct elements from V E are recognized by some element of UM. The mixed metric generator with a minimum number of elements is called a mixed metric basis of . Then, the cardinality of this mixed metric basis for is called the mixed metric dimension of , denoted by mdim(). The concept of studying chemical structures using graph theory terminologies is both appealing and practical. It enables researchers to more precisely and easily examines various chemical topologies and networks. In this paper, we consider two well known chemical structures; starphene SPa,b,c and six-sided hollow coronoid HCa,b,c and respectively compute their multiset dimension and mixed metric dimension.
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