Connected Dominating Sets in Triangulations
Abstract
We show that every n-vertex triangulation has a connected dominating set of size at most 10n/21. Equivalently, every n vertex triangulation has a spanning tree with at least 11n/21 leaves. Prior to the current work, the best known bounds were n/2, which follows from work of Albertson, Berman, Hutchinson, and Thomassen (J. Graph Theory 14(2):247--258). One immediate consequence of this result is an improved bound for the SEFENOMAP graph drawing problem of Angelini, Evans, Frati, and Gudmundsson (J. Graph Theory 82(1):45--64). As a second application, we show that for every set P of 11n/21 points in 2 every n-vertex planar graph has a one-bend non-crossing drawing in which some set of 11n/21 vertices is drawn on the points of P. The main result extends to n-vertex triangulations of genus-g surfaces, and implies that these have connected dominating sets of size at most 10n/21+O(gn).
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