Orientations of 10-Edge-Connected Planar Multigraphs and Applications
Abstract
A graph is called strongly 2k+1-connected if for each boundary function β: V(G) 2k+1 with Σv∈ V(G)β(v) 02k+1, there exists an orientation D of G such that dD+(v) - dD-(v) β(v) 2k+1 for each v ∈ V(G). We show that every planar multigraph with 5 edge-disjoint spanning trees is strongly 5-connected. This verifies a special case of the Additive Base Conjecture when restricted to planar graphs. Hence, every 10-edge-connected directed planar graph admits an antisymmetric 5-flow. So, by duality, every orientation of a planar graph of girth at least 10 admits a homomorphism to a 5-vertex tournament. Our result also gives a new proof of the known result that every planar graph of girth at least 10 has a homomorphism to the 5-cycle.
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