R. I. Bar-Gnar, V. M. Fomichev, “About the minimal primitive matrices”, Prikl. Diskr. Mat. Suppl., 2014, Issue 7,Pages <nobr>7

This article is cited in 3 papers

Theoretical Foundations of Applied Discrete Mathematics

About the minimal primitive matrices

R. I. Bar-Gnar^a, V. M. Fomichev^ba

^a National Engineering Physics Institute "MEPhI", Moscow
^b Financial University under the Government of the Russian Federation, Moscow

Abstract: A quadratic Boolean matrix $A$ is called a primitive matrix if some its degree does not contain 0's. A primitive matrix is called a minimal primitive matrix if it becomes non-primitive matrix after replacing any one 1 in it by 0. The height of a primitive matrix is defined as the least Hamming's distance between it and a minimal primitive matrix. In the paper, properties of minimal primitive matrices are studied. The amount of minimal primitive matrices of order $n$ is estimated. An algorithm for estimating the height of a primitive matrix is proposed.

Keywords: primitive matrix, lattice, antichain, computational complexity of the algorithm.

UDC: 519.7