Permutation Wordle

Abstract

We introduce a guessing game, permutation Wordle, in which a guesser attempts to recover a hidden permutation in Sn. In each round, the guesser guesses a permutation (using information from previous rounds) and is told which entries of that permutation are correct. We describe a natural guessing strategy, which we believe to be optimal. We show that the number of permutations this strategy solves in k+1 rounds is the Eulerian number A(n,k). We also describe an extension to suited permutations: the setter chooses a permutation in Sn and also a coloring of [n] using s colors. We generalize our strategy, give a recurrence for the number of suited permutations solved in k+1 rounds, and relate these numbers to the Eulerian numbers. In the case of two suits, or signed permutations, we also relate these numbers to the Eulerian numbers of type B.