Given the range space (P, R), where P is a set of n points in IR 2 and R is the family of subsets of P induced by all axis-parallel rectangles, the conflict-free coloring problem asks for a coloring of P with the minimum number of colors such that (P, R) is conflict-free. We study the following question: Given P, is it possible to add a small set of points Q such that (P ∪ Q, R) can be colored with fewer colors than (P, R)? Our main result is the following: given P, and any ε ≥ 0, one can always add a set Q of O(n1-ε) points such that P ∪ Q can be conflict-free colored using Õ(n3/8(1+ε))1 colors. Moreover, the set Q and the conflict-free coloring can be computed in polynomial time, with high probability. Our result is obtained by introducing a general probabilistic recoloring technique, which we call quasi-conflict-free coloring, and which may be of independent interest. A further application of this technique is also given. © Springer-Verlag Berlin Heidelberg 2006.
CITATION STYLE
Elbassioni, K., & Mustafa, N. H. (2006). Conflict-free colorings of rectangles ranges. In Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics) (Vol. 3884 LNCS, pp. 254–263). https://doi.org/10.1007/11672142_20
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