Cycles of Well-Linked Sets and an Elementary Bound for the Directed Grid Theorem

In 2015, Kawarabayashi and Kreutzer proved the directed grid theorem confirming a conjecture by Reed, Johnson, Robertson, Seymour, and Thomas from the mid-nineties. The theorem states the existence of a function $f$ such that every digraph of directed tree-width $f(k)$ contains a cylindrical grid of order $k$ as a butterfly minor, but the given function grows non-elementarily with the size of the grid minor. In this paper we present an alternative proof of the directed grid theorem which is conceptually much simpler, more modular in its composition and also improves the upper bound for the function $f$ to a power tower of height 22. Our proof is inspired by the breakthrough result of Chekuri and Chuzhoy, who proved a polynomial bound for the excluded grid theorem for undirected graphs. We translate a key concept of their proof to directed graphs by introducing \emph{cycles of well-linked sets (CWS)}, and show that any digraph of high directed tree-width contains a large CWS, which in turn contains a large cylindrical grid, improving the result due to Kawarabayashi and Kreutzer from an non-elementary to an elementary function. An immediate application of our result is an improvement of the bound for Younger's conjecture proved by Reed, Robertson, Seymour and Thomas (1996) from a non-elementary to an elementary function. The same improvement applies to other types of Erd\H{o}s-P\'osa style problems on directed graphs. To the best of our knowledge this is the first significant improvement on the bound for Younger's conjecture since it was proved in 1996. We believe that the theoretical tools we developed may find applications beyond the directed grid theorem, in a similar way as the path-of-sets-system framework due to Chekuri and Chuzhoy (2016) did (see for example Hatzel, Komosa, Pilipczuk and Sorge (2022); Chekuri and Chuzhoy (2015); Chuzhoy and Nimavat (2019)).