A neighborhood condition for fractional ID-[a,b]-factor-critical graphs

Abstract

Let G be a graph of order n, and let a and b be two integers with 1≤ a≤ b. Let h: E(G)→ [0,1] be a function. If a≤Σe xh(e)≤ b holds for any x∈ V(G), then we call G[Fh] a fractional [a,b]-factor of G with indicator function h where Fh=\e∈ E(G): h(e)>0\. A graph G is fractional independent-set-deletable [a,b]-factor-critical (in short, fractional ID-[a,b]-factor-critical) if G-I has a fractional [a,b]-factor for every independent set I of G. In this paper, it is proved that if n≥(a+2b)(2a+2b-3)+1b, δ(G)≥bna+2b+a and |NG(x) NG(y)|≥(a+b)na+2b for any two nonadjacent vertices x,y∈ V(G), then G is fractional ID-[a,b]-factor-critical. Furthermore, it is shown that this result is best possible in some sense.