A Resolution of the McCarty Conjecture

Abstract

The McCarty Conjecture states that any McCarty Matrix (an n× n matrix A with positive integer entries and each of the 2n row and column sums equal to n), can be additively decomposed into two other matrices, B and C, such that B has row and column sumsets both equal to \1, 2,... n\, and C has row and column sumsets both equal to \0, 1,... n-1\. The problem can also be formulated in terms of bipartite graphs. In this paper we use probabilistic methods to resolve this conjecture.

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