Generalization of matching extensions in graphs (II)
Abstract
Proposed as a general framework, Liu and Yu(Discrete Math. 231 (2001) 311-320) introduced (n,k,d)-graphs to unify the concepts of deficiency of matchings, n-factor-criticality and k-extendability. Let G be a graph and let n,k and d be non-negative integers such that n+2k+d≤ |V(G)|-2 and |V(G)|-n-d is even. If when deleting any n vertices from G, the remaining subgraph H of G contains a k-matching and each such k- matching can be extended to a defect-d matching in H, then G is called an (n,k,d)-graph. In Liu, the recursive relations for distinct parameters n, k and d were presented and the impact of adding or deleting an edge also was discussed for the case d = 0. In this paper, we continue the study begun in Liu and obtain new recursive results for (n,k,d)-graphs in the general case d ≥0.
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