Decomposing $4$-connected planar triangulations into two trees and one path
Combinatorics
2018-04-23 v2 Discrete Mathematics
Abstract
Refining a classical proof of Whitney, we show that any -connected planar triangulation can be decomposed into a Hamiltonian path and two trees. Therefore, every -connected planar graph decomposes into three forests, one having maximum degree at most . We use this result to show that any Hamiltonian planar triangulation can be decomposed into two trees and one spanning tree of maximum degree at most . These decompositions improve the result of Gon\c{c}alves [Covering planar graphs with forests, one having bounded maximum degree. J. Comb. Theory, Ser. B, 100(6):729--739, 2010] that every planar graph can be decomposed into three forests, one of maximum degree at most . We also show that our results are best-possible.
Keywords
Cite
@article{arxiv.1710.02411,
title = {Decomposing $4$-connected planar triangulations into two trees and one path},
author = {Kolja Knauer and Torsten Ueckerdt},
journal= {arXiv preprint arXiv:1710.02411},
year = {2018}
}
Comments
22 pages, 10 figures