Abstract:
The paper continues the study of the recently introduced class of SDD$_1$ matrices. The class of general SDD$_1$ matrices and three its subclasses are considered. In particular, it is shown that SDD$_1$ matrices are nonsingular $\mathcal{H}$-matrices. Also parameter-free upper bounds for the $l_\infty$-norm of the inverses to SDD$_1$ matrices are derived. The block triangular form to which any SDD$_1$ matrix can be brought by a symmetric permutation of its rows and columns is described.
Key words and phrases:SDD$_1$ matrices, SDD$_1^*$ matrices, SDD matrices, $S$-SDD matrices, nonsingular $\mathcal H$-matrices, upper bounds for the inverse, $l_\infty$-norm.
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