A. A. Taranenko, “Upper bounds on the permanent of multidimensional <nobr>$(0,1)$</nobr>-matrices”, Sib. Èlektron. Mat. Izv., 2014, Volume 11,Pages <nobr>958

This article is cited in 2 papers

Discrete mathematics and mathematical cybernetics

Upper bounds on the permanent of multidimensional $(0,1)$-matrices

A. A. Taranenko^ab

^a Novosibirsk State University, Pirogova, 2, 630090, Novosibirsk, Russia
^b Sobolev Institute of Mathematics, pr. Koptyuga, 4, 630090, Novosibirsk, Russia

Abstract: The permanent of a multidimensional matrix is the sum of products of entries over all diagonals.
By Minc's conjecture, there exists a reachable upper bound on the permanent of $2$-dimensional $(0,1)$-matrices. In this paper we obtain some generalizations of Minc's conjecture to the multidimensional case. For this purpose we prove and compare several bounds on the permanent of multidimensional $(0,1)$-matrices.
Most estimates can be used for matrices with nonnegative bounded entries.

Keywords: permanent, multidimensional matrix, $(0,1)$-matrix.

UDC: 519.143.3

MSC: 05A20

Received October 31, 2014, published December 8, 2014

Language: English