Lower and upper bounds for H-eigenvalues of even order real symmetric tensors

Abstract

In this article, we define new classes of tensors called double B-tensors, quasi-double B-tensors and establish some of their properties. Using these properties, we construct new regions viz., double B-intervals and quasi-double B-intervals, which contain all the H-eigenvalues of real even order symmetric tensors. We prove that the double B-intervals is contained in the quasi-double B-intervals and quasi-double B-intervals provide supplement information on the Brauer-type eigenvalues inclusion set of tensors. These are analogous to the double B-intervals of matrices established by J. M. Pe\~na~[On an alternative to Gerschgorin circles and ovals of Cassini, Numer. Math. 95 (2003), no. 2, 337-345.]