A complete solution of the k-uniform supertrees with the eight largest α-spectral radii

Abstract

Let T (n, k) be the set of the k-uniform supertrees with n vertices and m edges, where k≥ 3, n≥ 5 and m=n-1k-1. % Let m be the number of the edges of the supertrees in T (n, k), where m=n-1k-1. A conjecture concerning the supertrees with the fourth through the eighth largest α-spectral radii in T (n, k) was proposed by You et al.\ (2020), where 0 ≤ α<1, k≥ 3 and m ≥ 10. This conjecture was partially solved for 1-1m-2≤ α <1 and m≥ 10 by Wang et al.\ (2022). When 0≤ α <1-1m-2 and m ≥ 10, whether this conjecture is correct or not remains a problem to be further solved. By using a new α-normal labeling method proposed in this article for computing the α-spectral radius of the k-uniform hypergraphs, we completely prove that this conjecture is right for 0≤α<1 and m≥ 13.