An Alternative Proof of the H-Factor Theorem

Abstract

Let H: V(G) → 2N be a set mapping for a graph G. Given a spanning subgraph F of G, F is called a general factor or an H- factor of G if dF(x)∈ H(x) for every vertex x∈ V(G). H-factor problems are, in general, NP-complete problems and imply many well-known factor problems (e.g., perfect matchings, f-factor problems and (g, f)-factor problems) as special cases. Lov\'asz [The factorization of graphs (II), Acta Math. Hungar., 23 (1972), 223--246] gave a structure description and obtained a deficiency formula for H-optimal subgraphs. In this note, we use a generalized alternating path method to give a structural characterization and provide an alternative and shorter proof of Lov\'asz's deficiency formula.