31. Reconstructing perfect phylogenies via binary matrices, branchings in DAGs, and a generalization of Dilworth's theoremMartin Milanič, 2018, published scientific conference contribution abstract (invited lecture) Keywords: perfect phylogeny, NP-hard problem, graph coloring, branching, acyclic digraph, chain partition, Dilworth's theorem, min-max theorem, approximation algorithm, heuristic Published in RUP: 17.09.2018; Views: 1929; Downloads: 20 Link to full text |
32. MIPUP : minimum perfect unmixed phylogenies for multi-sampled tumors via branchings and ILPEdin Husić, Xinyue Li, Ademir Hujdurović, Miika Mehine, Romeo Rizzi, Veli Mäkinen, Martin Milanič, Alexandru I. Tomescu, 2018, original scientific article Keywords: perfect phylogeny, minimum conflict-free row split problem, branching, acyclic digraph, integer linear programming Published in RUP: 17.09.2018; Views: 2075; Downloads: 112 Link to full text |
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34. Perfect phylogenies via branchings in acyclic digraphs and a generalization of Dilworth's theoremAdemir Hujdurović, Edin Husić, Martin Milanič, Romeo Rizzi, Alexandru I. Tomescu, 2018, original scientific article Keywords: perfect phylogeny, minimum conflict-free row split problem, branching, acyclic digraph, chain partition, Dilworth's theorem, min-max theorem, approximation algorithm, APXhardness Published in RUP: 08.05.2018; Views: 2381; Downloads: 154 Link to full text |
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36. The minimum conflict-free row split problem revisitedAdemir Hujdurović, Edin Husić, Martin Milanič, Romeo Rizzi, Alexandru I. Tomescu, 2016, published scientific conference contribution Keywords: #the #minimum conflict-free row split problem, branching, Dilworth's theorem, min-max theorem, approximation algorithm, APX-hardness Published in RUP: 14.11.2017; Views: 2716; Downloads: 275 Link to full text This document has more files! More... |
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39. Set graphs. II. Complexity of set graph recognition and similar problemsMartin Milanič, Romeo Rizzi, Alexandru I. Tomescu, 2014, original scientific article Keywords: acyclic orientation, extensionality, set graphs, NP-complete problem, #P-complete problem, hyper-extensional digraphs, separating code, open-out-separating code Published in RUP: 03.04.2017; Views: 2331; Downloads: 131 Link to full text |
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