The Tutte's condition in terms of graph factors

Abstract

Let G be a connected general graph of even order, with a function f V(G)+. We obtain that G satisfies the Tutte's condition \[ o(G-S) Σv∈ Sf(v) any nonempty set S⊂ V(G), \] with respect to f if and only if G contains an H-factor for any function H V(G) 2 such that H(v)∈ \Jf(v),\,Jf+(v)\ for each v∈ V(G), where the set Jf(v) consists of the integer f(v) and all positive odd integers less than f(v), and the set J+f(v) consists of positive odd integers less than or equal to f(v)+1. We also obtain a characterization for graphs of odd order satisfying the Tutte's condition with respect to a function.