TY - GEN
T1 - The complexity of computing minimal unidirectional covering sets
AU - Baumeister, Dorothea
AU - Brandt, Felix
AU - Fischer, Felix
AU - Hoffmann, Jan
AU - Rothe, Jörg
N1 - Funding Information:
This work was supported in part by DFG grants BR-2312/3-2, BR-2312/6-1, RO-1202/11-1, RO-1202/12-1, the ESF EUROCORES program LogICCC, and the Humboldt Foundation’s TransCoop program.
PY - 2010
Y1 - 2010
N2 - Given a binary dominance relation on a set of alternatives, a common thread in the social sciences is to identify subsets of alternatives that satisfy certain notions of stability. Examples can be found in areas as diverse as voting theory, game theory, and argumentation theory. Brandt and Fischer [1] proved that it is NP-hard to decide whether an alternative is contained in some inclusion-minimal unidirectional (i.e., either upward or downward) covering set. For both problems, we raise this lower bound to the level of the polynomial hierarchy and provide a upper bound. Relatedly, we show that a variety of other natural problems regarding minimal or minimum-size unidirectional covering sets are hard or complete for either of NP, coNP, and . An important consequence of our results is that neither minimal upward nor minimal downward covering sets (even when guaranteed to exist) can be computed in polynomial time unless P=NP. This sharply contrasts with Brandt and Fischer's result that minimal bidirectional covering sets are polynomial-time computable.
AB - Given a binary dominance relation on a set of alternatives, a common thread in the social sciences is to identify subsets of alternatives that satisfy certain notions of stability. Examples can be found in areas as diverse as voting theory, game theory, and argumentation theory. Brandt and Fischer [1] proved that it is NP-hard to decide whether an alternative is contained in some inclusion-minimal unidirectional (i.e., either upward or downward) covering set. For both problems, we raise this lower bound to the level of the polynomial hierarchy and provide a upper bound. Relatedly, we show that a variety of other natural problems regarding minimal or minimum-size unidirectional covering sets are hard or complete for either of NP, coNP, and . An important consequence of our results is that neither minimal upward nor minimal downward covering sets (even when guaranteed to exist) can be computed in polynomial time unless P=NP. This sharply contrasts with Brandt and Fischer's result that minimal bidirectional covering sets are polynomial-time computable.
UR - http://www.scopus.com/inward/record.url?scp=77953768291&partnerID=8YFLogxK
U2 - 10.1007/978-3-642-13073-1_27
DO - 10.1007/978-3-642-13073-1_27
M3 - Conference contribution
AN - SCOPUS:77953768291
SN - 3642130720
SN - 9783642130724
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 299
EP - 310
BT - Algorithms and Complexity - 7th International Conference, CIAC 2010, Proceedings
T2 - 7th International Conference on Algorithms and Complexity, CIAC-2010
Y2 - 26 May 2010 through 28 May 2010
ER -