The ordering of hypertrees and unicyclic hypergraphs by the traces of Aα-tensor

Abstract

For a real number α∈[0,1] and a k-uniform hypergraph H, Aα(H)=αD(H)+(1-α)A(H) is called the Aα-tensor of H, where D(H) and A(H) are the degree tensor and adjacency tensor of H, respectively. The sum of the d-th powers of all eigenvalues of Aα(H) is called the d-th order Aα-spectral moment of H, which is equal to the d-th order trace of Aα(H). In this paper, some hypergraphs are ordered lexicographically by their Aα-spectral moments in non-decreasing order. The first, the second, the last and the second last hypergraphs among all k-uniform linear unicyclic hypergraphs and hypertrees are characterized, respectively. We give the first and the last hypergraphs among all k-uniform linear unicyclic hypergraphs with given grith, and characterize the last hypertree among all k-uniform hypertrees with given diameter. Furthermore, we determine some extreme values of the Aα-spectral moments for hypertrees and linear unicyclic hypergraphs, respectively.