On the number of 4-contractible edges in plane triangulations
Abstract
In 2007, Ando and Egawa proved a theorem which provides a lower bound on the number of contractible edges preserving 4-connectedness in 4-connected graphs. In this paper, we refine their bounds, especially for the 4-connected plane triangulations. In particular, we show that if G is a 4-connected plane triangulation of order at least 7, then G contains at least |V 5|+2 contractible edges preserving 4-connectedness, where V 5 is the set of vertices of degree at least 5. We also determine the extremal graphs.
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