A note on the edge partition of graphs containing either a light edge or an alternating 2-cycle

Abstract

Let Gα be a hereditary graph class (i.e, every subgraph of Gα∈ Gα belongs to Gα) such that every graph Gα in Gα has minimum degree at most 1, or contains either an edge uv such that dGα(u)+dGα(v)≤ α or a 2-alternating cycle. It is proved that every graph in Gα (α≥ 5) with maximum degree can be edge-partitioned into two forests F1, F2 and a subgraph H such that (Fi)≤ \2,-α+62\ for i=1,2 and (H)≤ α-5.