论文信息 - Ranks of zero patterns and sign patterns

Ranks of zero patterns and sign patterns

Let F be a field with at least three elements. Zero patterns P such that all matrices over F with pattern P have the same rank are characterized. Similar results are proven for sign patterns. These results are applied to answering two open questions on conditions for formal nonsingularity of a pattern P, as well as to proving a sufficient condition on P such that all matrices over F with pattern P have the same height characteristic.

Daniel Hershkowitz | H. Schneider

[1] D. Koenig. Theorie Der Endlichen Und Unendlichen Graphen , 1965 .

[2] Richard A. Brualdi,et al. Permanent of the direct product of matrices , 1966 .

[3] John Maybee,et al. Qualitative Economics and the Scope of the Correspondence Principle , 1968 .

[4] James Quirk,et al. Qualitative Problems in Matrix Theory , 1969 .

[5] Gernot M. Engel,et al. The Hadamard-Fischer inequality for a class of matrices defined by eigenvalue monotonicity , 1976 .

[6] H. Schneider,et al. On the singular graph and the Weyr characteristic of anM-matrix , 1978 .

[7] Emden R. Gansner. Acyclic Digraphs, Young Tableaux and Nilpotent Matrices , 1981 .

[8] Richard A. Brualdi,et al. Combinatorial verification of the elementary divisors of tensor products , 1985 .

[9] Hans Schneider,et al. Path Coverings of Graphs and Height Characteristics of Matrices , 1993, J. Comb. Theory, Ser. B.