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On Computation of Recently Defined Degree‐Based Topological Indices of Some Families of Convex Polytopes via M‐Polynomial

Topological indices are of incredible significance in the field of graph theory. Convex polytopes play a significant role both in various branches of mathematics and also in applied areas, most notably in linear programming. We have calculated some topological indices such as atom‐bond connectivity index, geometric arithmetic index, K‐Banhatti indices, and K‐hyper‐Banhatti indices and modified K‐Banhatti indices from some families of convex polytopes through M‐polynomials. The M‐polynomials of the graphs provide us with a great help to calculate the topological indices of different structures.

Wiley

Deeba Afzal Farkhanda Afzal Mohammad Reza Farahani Samia Ali

Complexity

2021

Title: On Computation of Recently Defined Degree‐Based Topological Indices of Some Families of Convex Polytopes via M‐Polynomial

Description:

Topological indices are of incredible significance in the field of graph theory.

Convex polytopes play a significant role both in various branches of mathematics and also in applied areas, most notably in linear programming.

We have calculated some topological indices such as atom‐bond connectivity index, geometric arithmetic index, K‐Banhatti indices, and K‐hyper‐Banhatti indices and modified K‐Banhatti indices from some families of convex polytopes through M‐polynomials.

The M‐polynomials of the graphs provide us with a great help to calculate the topological indices of different structures.

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