Improved product structure for graphs on surfaces
Abstract
Dujmovi\'c, Joret, Micek, Morin, Ueckerdt and Wood [J. ACM 2020] proved that for every graph G with Euler genus g there is a graph H with treewidth at most 4 and a path P such that G⊂eq H P K\2g,3\. We improve this result by replacing "4" by "3" and with H planar. We in fact prove a more general result in terms of so-called framed graphs. This implies that every (g,d)-map graph is contained in H P K, for some planar graph H with treewidth 3, where =\2g d2 ,d+3d2-3\. It also implies that every (g,1)-planar graph (that is, graphs that can be drawn in a surface of Euler genus g with at most one crossing per edge) is contained in H P K\4g,7\, for some planar graph H with treewidth 3.
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