The primitive Boolean matrices with the second largest scrambling index by Boolean rank. Yan Ling Shao; Yubin Gao · Czechoslovak Mathematical Journal (2014).

Aug 13, 2014 · In this paper, we characterize primitive Boolean matrices that achieve the second largest scrambling index in terms of their Boolean rank.

Abstract. The scrambling index of an n × n primitive Boolean matrix A is the smallest positive integer k such that Ak(AT)k = J, where AT denotes the ...

In this paper, we characterize primitive Boolean matrices that achieve the second largest scrambling index in terms of their Boolean rank. Identifiers. journal ...

In this paper, we give an upper bound on the scrambling index of an n × n primitive matrix M in terms of its Boolean rank b ( M ) .

In this paper, we investigate the scrambling index of symmetric primitive matrices ... Kirkland, Primitive digraphs with the largest scrambling index, Linear ...

In this paper, we investigate the generalized μ-scrambling indices of a primitive digraph and obtain some exact lower and upper bounds for the generalized μ- ...

Oct 11, 2009 · This paper characterize primitive Boolean matrices that achieve the second largest scrambling index in terms of their Boolean rank.

Apr 2, 2008 · There are numerous results giving the upper bounds on the second largest modulus of eigenvalues of primitive stochastic matrices (see [3,5–8]).

On the second largest scrambling index of primitive matrices. Article. Jan 2014. Y. Shao · Y. Gao. The scrambling index of an n × n primitive matrix A is the ...