Decomposition of Sparse Graphs into Forests and a Graph with Bounded Degree
Seog-Jin Kim (김석진)
Dept. of Mathematics Education, Konkuk University, Seoul, Korea.
Dept. of Mathematics Education, Konkuk University, Seoul, Korea.
2011/3/10 Thu 5PM-6PM
Say that a graph with maximum degree at most d is d-bounded. For d>k, we prove a sharp sparseness condition for decomposability into k forests and a d-bounded graph. Consequences ar e that every graph with fractional arboricity at most k+ d/(k+d+1) has such a decomposition, and (for k=1) every graph with maximum average degree less than 2+2d/(d+2) decomposes into a forest and a d-bounded graph. When d=k+1, and when k=1 and d≤6, the d-bounded graph in the decomposition can also be required to be a forest. When k=1 and d≤2, the d-bounded forest can also be required to have at most d edges in each component.
This is joint work with A.V. Kostochka, D.B. West, H. Wu, and X. Zhu.
This is joint work with A.V. Kostochka, D.B. West, H. Wu, and X. Zhu.