Some properties of \k\-packing function problem in graphs

Abstract

The recently introduced \k\-packing function problem is considered in this paper. Special relation between a case when k=1, k 2 and linear programming relaxation is introduced with sufficient conditions for optimality. For arbitrary simple connected graph G there is construction procedure for finding values of k for which L\k\(G) can be determined in the polynomial time. Additionally, relationship between \1\-packing function and independent set number is established. Optimal values for some special classes of graphs and general upper and lower bounds are introduced.