Upper bounds for Z1-eigenvalues of generalized Hilbert tensors

Abstract

In this paper, we introduce the concept of Z1-eigenvalue to infinite dimensional generalized Hilbert tensors (hypermatrix) Hλ∞=(Hi1i2·s im), Hi1i2·s im=1i1+i2+·s im+λ,\ λ∈ R-;\ i1,i2,·s,im=0,1,2,·s,n,·s, and proved that its Z1-spectral radius is not larger than π for λ>12, and is at most πλπ for 12≥ λ>0. Besides, the upper bound of Z1-spectral radius of an mth-order n-dimensional generalized Hilbert tensor Hλn is obtained also, and such a bound only depends on n and λ.