All fractional (g,f)-factors in graphs

Abstract

Let G be a graph, and g,f:V(G)→ N be two functions with g(x)≤ f(x) for each vertex x in G. We say that G has all fractional (g,f)-factors if G includes a fractional r-factor for every r:V(G)→ N such that g(x)≤ r(x)≤ f(x) for each vertex x in G. Let H be a subgraph of G. We say that G admits all fractional (g,f)-factors including H if for every r:V(G)→ N with g(x)≤ r(x)≤ f(x) for each vertex x in G, G includes a fractional r-factor Fh with h(e)=1 for any e∈ E(H), then we say that G admits all fractional (g,f)-factors including H, where h:E(G)→ [0,1] is the indicator function of Fh. In this paper, we obtain a characterization for the existence of all fractional (g,f)-factors including H and pose a sufficient condition for a graph to have all fractional (g,f)-factors including H.