Bounds for the infinity norm of the inverse for certain M- and H-matrices

The paper presents new two-sided bounds for the infinity norm of the inverse for the so-called PM-matrices, which form a subclass of the class of nonsingular M-matrices and contain the class of strictly diagonally dominant matrices. These bounds are shown to be monotone with respect to the underlying partitioning of the index set, and the equality cases are analyzed. Also an upper bound for the infinity norm of the inverse of a PH-matrix (whose comparison matrix is a PM-matrix) is derived. The known Ostrowski, Ahlberg–Nilson–Varah, and Morača bounds are shown to be special cases of the upper bound obtained.