An Extension of Cui-Kano's Characterization Problem on Graph Factors

Abstract

Let G be a graph with vertex set V(G) and let H:V(G)→ 2N be a set function associating with G. An H-factor of graph G is a spanning subgraphs F such that dF(v)∈ H(v)4emfor everyv∈ V(G). Let f:V(G)→ N be an even integer-valued function such that f≥ 4 and let Hf(v)=\1,3,...,f(v)-1, f(v)\ for v∈ V(G). In this paper, we investigate Hf-factors of graphs G by using Lov\'asz's structural descriptions. Let o(G) denote the number of odd components of G. We show that if one of the following conditions holds, then G contains an Hf-factor. [(i)] o(G-S)≤ f(S) for all S⊂eq V(G); [(ii)] |V(G)| is odd, dG(v)≥ f(v)-1 for all v∈ V(G) and o(G-S)≤ f(S) for all ≠ S⊂eq V(G). As a corollary, we show that if a graph G with odd order and minimum degree 2n-1 satisfies o(G-S)≤ 2n|S|4emfor all ≠ S⊂eq V(G), then G contains an Hn-factor. In particular, we make progress on the characterization problem for a special family of graphs proposed by Akiyama and Kano.