Permutation Wordle
Abstract
We introduce a guessing game, permutation Wordle, in which a guesser attempts to recover a hidden permutation in . 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 rounds is the Eulerian number . We also describe an extension to suited permutations: the setter chooses a permutation in and also a coloring of using colors. We generalize our strategy, give a recurrence for the number of suited permutations solved in 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.
Cite
@article{arxiv.2408.00903,
title = {Permutation Wordle},
author = {Samuel A. Kutin and Lawren M. Smithline},
journal= {arXiv preprint arXiv:2408.00903},
year = {2026}
}
Comments
15 pages; references added, some results generalized. January 2026: 18 pages; references added, expanded exposition, new diagrams