TY - GEN
T1 - Tournament solutions and their applications to multiagent decision making
AU - Brandt, Felix
N1 - Publisher Copyright:
© Springer-Verlag Berlin Heidelberg 2010.
PY - 2010
Y1 - 2010
N2 - Given a finite set of alternatives and choices between all pairs of alternatives, how to choose from the entire set in a way that is faithful to the pairwise comparisons? This simple, yet captivating, problem is studied in the literature on tournament solutions. A tournament solution thus seeks to identify the “best” elements according to some binary dominance relation, which is usually assumed to be asymmetric and complete. As the ordinary notion of maximality may return no elements due to cyclical dominations, numerous alternative solution concepts have been devised and axiomatized. Many problems in multiagent decision making can be addressed using tournament solutions. For instance, tournament solutions play an important role in collective decision-making (social choice theory), where the binary relation is typically defined via pairwise majority voting. Other application areas include adversarial decision-making (theory of zero-sum games) and coalitional decision-making (cooperative game theory) as well as multi-criteria decision analysis and argumentation theory. In this talk, I will present an overview of some of the most common tournament solutions such as the uncovered set, the minimal covering set, and the bipartisan set and analyze them from an algorithmic point of view.
AB - Given a finite set of alternatives and choices between all pairs of alternatives, how to choose from the entire set in a way that is faithful to the pairwise comparisons? This simple, yet captivating, problem is studied in the literature on tournament solutions. A tournament solution thus seeks to identify the “best” elements according to some binary dominance relation, which is usually assumed to be asymmetric and complete. As the ordinary notion of maximality may return no elements due to cyclical dominations, numerous alternative solution concepts have been devised and axiomatized. Many problems in multiagent decision making can be addressed using tournament solutions. For instance, tournament solutions play an important role in collective decision-making (social choice theory), where the binary relation is typically defined via pairwise majority voting. Other application areas include adversarial decision-making (theory of zero-sum games) and coalitional decision-making (cooperative game theory) as well as multi-criteria decision analysis and argumentation theory. In this talk, I will present an overview of some of the most common tournament solutions such as the uncovered set, the minimal covering set, and the bipartisan set and analyze them from an algorithmic point of view.
UR - http://www.scopus.com/inward/record.url?scp=85038106697&partnerID=8YFLogxK
U2 - 10.1007/978-3-642-16178-0_1
DO - 10.1007/978-3-642-16178-0_1
M3 - Conference contribution
AN - SCOPUS:85038106697
SN - 9783642161773
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 1
BT - Multiagent System Technologies - 8th German Conference, MATES 2010, Proceedings
A2 - Witteveen, Cees
A2 - Dix, Jurgen
PB - Springer Verlag
T2 - 8th German Conference on Multiagent System Technologies, MATES 2010
Y2 - 27 September 2010 through 29 September 2010
ER -