| Abstract: | Let m ≤ n ≤ k. An m × n × k 0‐1 array is a Latin box if it contains exactly m n ones, and has at most one 1 in each line. As a special case, Latin boxes in which m = n = k are equivalent to Latin squares. Let  be the distribution on m × n × k 0‐1 arrays where each entry is 1 with probability p, independently of the other entries. The threshold question for Latin squares asks when  contains a Latin square with high probability. More generally, when does  support a Latin box with high probability? Let ε > 0. We give an asymptotically tight answer to this question in the special cases where n = k and  , and where n = m and  . In both cases, the threshold probability is  . This implies threshold results for Latin rectangles and proper edge‐colorings of Kn,n. |
