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@inproceedings{1298543, author = {Adamaszek, Anna and Popa, Alexandru}, address = {Berlin}, booktitle = {11th Latin American Theoretical Informatics Symposium, LATIN 2014}, doi = {http://dx.doi.org/10.1007/978-3-642-54423-1_59}, keywords = {Algorithms; Information science; Polynomial approximation}, howpublished = {tištěná verze "print"}, language = {eng}, location = {Berlin}, isbn = {978-3-642-54422-4}, pages = {683-694}, publisher = {Springer}, title = {Algorithmic and Hardness Results for the Colorful Components Problems}, year = {2014} }
TY - JOUR ID - 1298543 AU - Adamaszek, Anna - Popa, Alexandru PY - 2014 TI - Algorithmic and Hardness Results for the Colorful Components Problems PB - Springer CY - Berlin SN - 9783642544224 KW - Algorithms KW - Information science KW - Polynomial approximation N2 - In this paper we investigate the colorful components framework, motivated by applications emerging from comparative genomics. The general goal is to remove a collection of edges from an undirected vertex-colored graph G such that in the resulting graph C' all the connected components are colorful (i.e., any two vertices of the same color belong to different connected components). We want G' to optimize an objective function, the selection of this function being specific to each problem in the framework. We analyze three objective functions, and thus, three different problems, which are believed to be relevant for the biological applications: minimizing the number of singleton vertices, maximizing the number of edges in the transitive closure, and minimizing the number of connected components. Our main result is a polynomial-time algorithm for the first problem. This result disproves the conjecture of Zheng et al. that the problem is NP-hard (assuming P not equal NP). Then, we show that the second problem is APX-hard, thus proving and strengthening the conjecture of Zheng et al. that the problem is NP-hard. Finally, we show that the third problem does not admit polynomial-time approximation within a factor of vertical bar V vertical bar(1/14-epsilon) for any epsilon > 0, assuming P not equal NP (or within a factor of vertical bar V vertical bar(1/2-epsilon), assuming ZPP not equal NP). ER -
ADAMASZEK, Anna a Alexandru POPA. Algorithmic and Hardness Results for the Colorful Components Problems. In \textit{11th Latin American Theoretical Informatics Symposium, LATIN 2014}. Berlin: Springer, 2014, s.~683-694. ISBN~978-3-642-54422-4. Dostupné z: https://dx.doi.org/10.1007/978-3-642-54423-1\_{}59.
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