Nosheen Goshi scite author profile

Nosheen Goshi

3Publications

1Citation Statement Received

33Citation Statements Given

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University of Management and Technology

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Fractional metric dimension of generalized prism graph

Goshi¹,

Zafar²,

Rashid³

2022

Proyecciones (Antofagasta)

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Fractional metric dimension of connected graph G was introduced by Arumugam et al. in [Discrete Math. 312, (2012), 1584-1590] as a natural extension of metric dimension which have many applications in different areas of computer sciences for example optimization, intelligent systems, networking and robot navigation. In this paper fractional metric dimension of generalized prism graph Pm × Cn is computed using combinatorial criterion devised by Liu et al. in [Mathematics, 7(1), (2019), 100].

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Fractional local edge dimensions of a graph

Goshi

Zafar

Rashid

2023

Discrete Math. Algorithm. Appl.

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Metric-based parameters aided the study of the structural properties of graph network space like complexity, central tendency, connectivity, robustness, accessibility, and vulnerability. At the same time, these parameters played a pivotal role in rectifying problems in navigation, integer programming, optimization, pattern recognition and avoidance, combinatoric detection, backtracking in geographical routing, etc. In this paper, we considered the fractional edge dimension, a metric-based parameter in local environment by initiating the study of the fractional local edge dimensions of a graph (FLED). We define the aforesaid concept and give its bounds. We discussed the characterization problem for FLED equal to [Formula: see text], the realization problem, and its relation with the fractional metric dimensions. We also calculated the FLED of the Petersen graph, Coxeter graph, the families of cycle, complete, wheel, grid and complete [Formula: see text]-partite graphs.

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A Combinatorial Approach to the Computation of the Fractional Edge Dimension of Graphs

et al. 2021

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E. Yi recently introduced the fractional edge dimension of graphs. It has many applications in different areas of computer science such as in sensor networking, intelligent systems, optimization, and robot navigation. In this paper, the fractional edge dimension of vertex and edge transitive graphs is calculated. The class of hypercube graph Qn with an odd number of vertices n is discussed. We propose the combinatorial criterion for the calculation of the fractional edge dimension of a graph, and hence applied it to calculate the fractional edge dimension of the friendship graph Fk and the class of circulant graph Cn(1,2).

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Nosheen Goshi

Fractional metric dimension of generalized prism graph

Fractional local edge dimensions of a graph

A Combinatorial Approach to the Computation of the Fractional Edge Dimension of Graphs

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