A new combinatorial method using directed graphs identifies matrix patterns that require the non-symmetric strong spectral property, shows that irreducible tridiagonal patterns do not always require it, and confirms a minimum of 2n-1 arcs for several digraph families.
On a new graph invariant and a criterion for planarity
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Combinatorial aspects of the non-symmetric strong spectral property for graphs
A new combinatorial method using directed graphs identifies matrix patterns that require the non-symmetric strong spectral property, shows that irreducible tridiagonal patterns do not always require it, and confirms a minimum of 2n-1 arcs for several digraph families.