3-packings in Triangulations: Algorithms, bounds, and Complexity

Abstract

We study H-packings in plane triangulations for the three-vertex graphs H∈\P3,K3,P2 P1\. For a graph H, let λH(G) denote the maximum size of an H-packing in G, with the convention that for H=P2 P1 the copies are required to be induced. For P3-packings, we prove that every triangulation G on n vertices satisfies λP3(G) n5, and show that this lower bound is asymptotically tight. We also study triangle packings in triangulations and provide lower bounds for λK3(G) in terms of the maximum degree and the degree sequence. We give a face-path characterization of triangle factors in 4-connected plane triangulations using a hamiltonian cycle and the weak duals of the two associated maximal outerplanar graphs. Finally, for induced packings by P2 P1, we prove that every plane triangulation T on n vertices satisfies λP2 P1(T) n3-2, and show that such a packing can be found in polynomial time.