Signed magic rectangles with three filled cells in each column

Abstract: A {\em signed magic rectangle} $SMR(m,n;k, s)$ is an $m \times n$ array with entries from $X$, where $X={0,\pm1,\pm2,\ldots, $ $\pm (mk-1)/2}$ if $mk$ is odd and $X = {\pm1,\pm2,\ldots,\pm mk/2}$ if $mk$ is even, such that precisely $k$ 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 $SMR(m,n;k, 3)$ exists if and only if $3\leq m,k\leq n$ and $mk=3n$.