Simplified existence theorems on all fractional [a,b]-factors

Abstract

Let G be a graph with order n and let g, f : V (G)→ N such that g(v)≤ f(v) for all v∈ V(G). We say that G has all fractional (g, f)-factors if G has a fractional p-factor for every p: V (G)→ N such that g(v)≤ p(v)≤ f (v) for every v∈ V(G). Let a<b be two positive integers. %and G a graph of order n sufficiently large %for a and b. If g a, f b and G has all fractional (g,f)-factors, then we say that G has all fractional [a,b]-factors. Suppose that n is sufficiently large for a and b. This paper contains two results on the existence of all (g,f)-factors of graphs. First, we derive from Anstee's fractional (g,f)-factor theorem a similar characterization for the property of all fractional (g,f)-factors. Second, we show that G has all fractional [a, b]-factors if the minimum degree is at least 14a((a+b-1)2+4b) and every pair of nonadjacent vertices has cardinality of the neighborhood union at least bn/(a + b). These lower bounds are sharp.