The Alon-Tarsi number of subgraphs of a planar graph
Abstract
This paper constructs a planar graph G1 such that for any subgraph H of G1 with maximum degree (H) 3, G1-E(H) is not 3-choosable, and a planar graph G2 such that for any star forest F in G2, G2-E(F) contains a copy of K4 and hence G2-E(F) is not 3-colourable. On the other hand, we prove that every planar graph G contains a forest F such that the Alon-Tarsi number of G - E(F) is at most 3, and hence G - E(F) is 3-paintable and 3-choosable.
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