Signed magic rectangles with two filled cells in each column

Abstract

A signed magic rectangle SMR(m,n;r, s) is an m × n array with entries from X, where X=\0,1,2,…, (ms-1)/2\ if mr is odd and X = \1,2,…, mr/2\ if mr is even, such that precisely r cells in every row and s cells in every column are filled, every integer from set X appears exactly once in the array and the sum of each row and of each column is zero. In this paper we prove that a signed magic rectangle SMR(m,n;r, 2) exists if and only if either m=2 and n=r 0,3 4 or m,r≥ 3 and mr=2n.