Ali H. Alkhaldi scite author profile

Metric dimension of networks is a distance based parameter that is used to rectify the distance related problems in robotics, navigation and chemical strata. The fractional metric dimension is the latest developed weighted version of metric dimension and a generalization of the concept of local fractional metric dimension. Computing the fractional metric dimension for all the connected networks is an NP-hard problem. In this note, we find the sharp bounds of the fractional metric dimensions of all the connected networks under certain conditions. Moreover, we have calculated the fractional metric dimension of grid-like networks, called triangular and polaroid grids, with the aid of the aforementioned criteria. Moreover, we analyse the bounded and unboundedness of the fractional metric dimensions of the aforesaid networks with the help of 2D as well as 3D plots.

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Linear triangular optimization technique and pricing scheme in residential energy management systems

Anees

Hussain

Alkhaldi

et al. 2018

Results in Physics

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Ali H. Alkhaldi

Construction of chaotic quantum magnets and matrix Lorenz systems S-boxes and their applications

Ricci curvature on warped product submanifolds in spheres with geometric applications

Eigenvalue inequalities for the p-Laplacian operator on C-totally real submanifolds in Sasakian space forms

Bounds of Fractional Metric Dimension and Applications with Grid-Related Networks

Linear triangular optimization technique and pricing scheme in residential energy management systems

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