Spectral properties of p-Sombor matrices and beyond

Abstract

Let G=(V(G),E(G)) be a simple graph with vertex set V(G)=\v1,v2,·s, vn\ and edge set E(G). The p-Sombor matrix Sp(G) of G is the square matrix of order n whose (i,j)-entry is equal to ((di)p+(dj)p)1p if vi vj, and 0 otherwise, where di denotes the degree of vertex vi in G. In this paper, we study the relationship between p-Sombor index SOp(G) and p-Sombor matrix Sp(G) by the k-th spectral moment Nk and the spectral radius of Sp(G). Then we obtain some bounds of p-Sombor Laplacian eigenvalues, p-Sombor spectral radius, p-Sombor spectral spread, p-Sombor energy and p-Sombor Estrada index. We also investigate the Nordhaus-Gaddum-type results for p-Sombor spectral radius and energy. At last, we give the regression model for boiling point and some other invariants.

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