论文信息 - A theorem of the alternatives for the equation |Ax| − |B||x| = b

A theorem of the alternatives for the equation |Ax| − |B||x| = b

The following theorem is proved: given square matrices A, D of the same size, D nonnegative, then either the equation Ax + B|x| = b has a unique solution for each B with |B| ≤ D and for each b, or the equation Ax + B 0|x| = 0 has a nontrivial solution for some matrix B 0 of a very special form, |B 0| ≤ D; the two alternatives exclude each other. Some consequences of this result are drawn. In particular, we define a λ to be an absolute eigenvalue of A if |Ax| = λ|x| for some x ≠ 0, and we prove that each square real matrix has an absolute eigenvalue.

Jiri Rohn | J. Rohn

[1] Helmut Beeck,et al. Zur Problematik der Hüllenbestimmung von Intervallgleichungssystemen , 1975, Interval Mathematics.

[2] J. Farkas. Theorie der einfachen Ungleichungen. , 1902 .

[3] Katta G. Murty,et al. On the number of solutions to the complementarity problem and spanning properties of complementary cones , 1972 .

[4] O. Mangasarian,et al. Absolute value equations , 2006 .

[5] J. Rohn. Systems of linear interval equations , 1989 .

[6] Svatopluk Poljak,et al. Checking robust nonsingularity is NP-hard , 1993, Math. Control. Signals Syst..

[7] O. Perron. Zur Theorie der Matrices , 1907 .

[8] J. Rohn. Interval matrices: singularity and real eigenvalues , 1993 .