Treewidth of the n × n toroidal grid

Abstract

In this paper, we show that the treewidth of the n × n toroidal grid is 2n-1 for all n 5. This closes the gap between the previously known upper bound of 2n-1 (Ellis and Warren, DAM 2008) and the lower bound of 2n-2 (Kiyomi, Okamoto, and Otachi, DAM 2016). To establish the matching lower bound, we construct a bramble of maximum order by utilizing maximum components obtained after removing 2n-1 vertices. Our construction relies on the vertex-isoperimetric properties of the infinite grid to establish tight lower bounds on neighborhood sizes, combined with a careful analysis of balls of radius n/2-1 and their boundaries to overcome structural obstructions when n is even.