Minimum degree of minimal (n-10)-factor-critical graphs

Abstract

A graph G of order n is said to be k-factor-critical for integers 1≤ k < n, if the removal of any k vertices results in a graph with a perfect matching. A k-factor-critical graph G is called minimal if for any edge e∈ E(G), G-e is not k-factor-critical. In 1998, O. Favaron and M. Shi conjectured that every minimal k-factor-critical graph of order n has the minimum degree k+1 and confirmed it for k=1, n-2, n-4 and n-6. By using a novel approach, we have confirmed it for k = n - 8 in a previous paper. Continuing this method, we prove the conjecture to be true for k=n-10 in this paper.

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