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Open Access Research Article Issue
The multiplicative degree-Kirchhoff index and complexity of a class of linear networks
AIMS Mathematics 2024, 9(3): 7111-7130
Published: 15 March 2024
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In this paper, we focus on the strong product of the pentagonal networks. Let R n be a pentagonal network composed of 2 n pentagons and n quadrilaterals. Let P n 2 denote the graph formed by the strong product of R n and its copy R n . By utilizing the decomposition theorem of the normalized Laplacian characteristics polynomial, we characterize the explicit formula of the multiplicative degree-Kirchhoff index completely. Moreover, the complexity of P n 2 is determined.

Open Access Research Article Issue
Analyzing the normalized Laplacian spectrum and spanning tree of the cross of the derivative of linear networks
AIMS Mathematics 2024, 9(6): 14594-14617
Published: 23 April 2024
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In this paper, we focus on the strong product of the pentagonal networks. Let R n be a hexagonal network composed of 2 n pentagons and n quadrilaterals. Let P n 2 denote the graph formed by the strong product of R n and its copy R n . By utilizing the decomposition theorem of the normalized Laplacian characteristics polynomial, we characterize the explicit formula of the multiplicative degree-Kirchhoff index completely. Moreover, the complexity of P n 2 is determined.

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