Infinite and finite dimensional Hilbert tensors

Abstract

For an m-order n-dimensional Hilbert tensor (hypermatrix) Hn=(Hi1i2·s im), Hi1i2·s im=1i1+i2+·s+im-m+1,\ i1,·s, im=1,2,·s,n its spectral radius is not larger than nm-1πn, and an upper bound of its E-spectral radius is nm2πn. Moreover, its spectral radius is strictly increasing and its E-spectral radius is nondecreasing with respect to the dimension n. When the order is even, both infinite and finite dimensional Hilbert tensors are positive definite. We also show that the m-order infinite dimensional Hilbert tensor (hypermatrix) H∞=(Hi1i2·s im) defines a bounded and positively (m-1)-homogeneous operator from l1 into lp (1<p<∞), and the norm of corresponding positively homogeneous operator is smaller than or equal to π6.