📝 SummarXiv

Abstract

We generalize the classical "1089-number trick", which states that a certain combination of addition, subtraction and swapping the digits of a three-digit number will always output 1089. More precisely, we show that any pair of zero divisors $f\circ g=0$ in the group ring ${\mathbb Z}[\Sigma_n]$ on the n-th symmetric group gives rise to a partition of the set of n-digit numbers into subsets $U_{\mathbf c}$ defined by linear inequalities, such that the zero divisors act constantly on each $U_{\mathbf c}$ and hence define a number trick.