info:eu-repo/semantics/article
Towards a polynomial equivalence between {k}-packing functions and k-limited packings in graphs
Fecha
2016-05Registro en:
Leoni, Valeria Alejandra; Dobson, Maria Patricia; Towards a polynomial equivalence between {k}-packing functions and k-limited packings in graphs; Springer; Lecture Notes in Computer Science; 9849; 5-2016; 160-165
0302-9743
CONICET Digital
CONICET
Autor
Leoni, Valeria Alejandra
Dobson, Maria Patricia
Resumen
Given a positive integer k, the {k}-packing function problem ({k}PF) is to find in a given graph G, a function f of maximum weight that assigns a non-negative integer to the vertices of G in such a way that the sum of f(v) over each closed neighborhood is at most k. This notion was recently introduced as a variation of the k-limited packing problem (kLP) introduced in 2010, where the function was supposed to assign a value in {0, 1}. For all the graph classes explored up to now, {k}PF and kLP have the same computational complexity. It is an open problem to determine a graph class where one of them is NP-complete and the other, polynomially solvable. In this work, we first prove that {k}PF is NP-complete for bipartite graphs, as kLP is known to be. We also obtain new graph classes where the complexity of these problems would coincide.