Parameterized Algorithms for Modular-Width

• Autoři: GAJARSKÝ Jakub; LAMPIS Michael; ORDYNIAK Sebastian
• Rok publikování: 2013
• Druh: Článek ve sborníku
• Konference: Parameterized and Exact Computation
• Fakulta / Pracoviště MU: Fakulta informatiky
• Doi: http://dx.doi.org/10.1007/978-3-319-03898-8_15
• Obor: Informatika
• Klíčová slova: parameterized complexity; modular width; shrub depth; chromatic number; hamiltonian path
• Popis: It is known that a number of natural graph problems which are FPT parameterized by treewidth become W-hard when parameterized by clique-width. It is therefore desirable to find a different structural graph parameter which is as general as possible, covers dense graphs but does not incur such a heavy algorithmic penalty. The main contribution of this paper is to consider a parameter called modular-width, defined using the well-known notion of modular decompositions. Using a combination of ILP and dynamic programming we manage to design FPT algorithms for Coloring and Partitioning into paths (and hence Hamiltonian path and Hamiltonian cycle), which are W-hard for both clique-width and its recently introduced restriction, shrub-depth. We thus argue that modular-width occupies a sweet spot as a graph parameter, generalizing several simpler notions on dense graphs but still evading the “price of generality” paid by clique-width.

Související projekty

• Třídy dobře strukturovaných kombinatorických objektů, šířkové parametry a návrh efektivních algoritmů
• Zaměstnáním čerstvých absolventů doktorského studia k vědecké excelenci
• Zapojení studentů Fakulty informatiky do mezinárodní vědecké komunity
• Rozsáhlé výpočetní systémy: modely, aplikace a verifikace II.