Discrepancy of High-Dimensional Permutations

Abstract

Let L be an order-n Latin square. For X, Y, Z ⊂eq \1, ... ,n\, let L(X, Y. Z) be the number of triples i∈ X, j∈ Y, k∈ Z such that L(i,j) = k. We conjecture that asymptotically almost every Latin square satisfies |L(X, Y, Z) - 1n |X||Y||Z|| O(|X||Y||Z|) for every X, Y and Z. Let (L):= |X||Y||Z| when L(X, Y, Z)=0. The above conjecture implies that (L) O(n2) holds asymptotically almost surely (this bound is obviously tight). We show that there exist Latin squares with (L) O(n2), and that (L) O(n2 2 n) for almost every order-n Latin square. On the other hand, we recall that (L)≥ (n33/14) if L is the multiplication table of an order-n group. Some of these results extend to higher dimensions. Many open problems remain.