Tournament solutions play an important role within social choice theory and the mathematical social sciences at large. In 2011, Brandt proposed a new tournament solution called the minimal extending set (ME) and an associated graph-theoretic conjecture. If the conjecture had been true, ME would have satisfied a number of desirable properties that are usually considered in the literature on tournament solutions. However, in 2013, the existence of an enormous counter-example to the conjecture was shown using a non-constructive proof. This left open which of the properties are actually satisfied by ME. It turns out that ME satisfies idempotency, irregularity, and inclusion in the iterated Banks set (and hence the Banks set, the uncovered set, ...
Tournament solutions are frequently used to select winners from a set of alternatives based on pairw...
A voting situation, in which voters are asked to rank all candidates pair by pair, induces a tournam...
A tournament is any complete asymmetric relation over a finite set A of outcomes describing pairwise...
Tournament solutions play an important role within social choice theory and the mathematical social ...
In 2011, Brandt proposed a new tournament solution called the minimal extending set (ME). It was con...
We propose a systematic methodology for defining tournament solutions as extensions of maximality. T...
Tournament solutions, i.e., functions that associate with each complete and asymmetric relation on a...
Tournament solutions, i.e., functions that associate with each complete and asymmetric relation on a...
Abstract Tournament solutions, i.e., functions that associate with each complete and asymmetric rela...
An important subclass of social choice functions, so-called majoritarian (or C1) functions, only tak...
A tournament solution is a function that maps a tournament, i.e., a directed graph representing an a...
An important subclass of social choice functions, so-called majoritarian (or C1) functions, only tak...
Tournament solutions, i.e., functions that associate with each complete and asym-metric relation on ...
Tournament solutions provide methods for selecting the “best” alternatives from a tournament and hav...
Every tournament on 7 vertices is the majority relation of a 3-permutation profile, and there exist ...
Tournament solutions are frequently used to select winners from a set of alternatives based on pairw...
A voting situation, in which voters are asked to rank all candidates pair by pair, induces a tournam...
A tournament is any complete asymmetric relation over a finite set A of outcomes describing pairwise...
Tournament solutions play an important role within social choice theory and the mathematical social ...
In 2011, Brandt proposed a new tournament solution called the minimal extending set (ME). It was con...
We propose a systematic methodology for defining tournament solutions as extensions of maximality. T...
Tournament solutions, i.e., functions that associate with each complete and asymmetric relation on a...
Tournament solutions, i.e., functions that associate with each complete and asymmetric relation on a...
Abstract Tournament solutions, i.e., functions that associate with each complete and asymmetric rela...
An important subclass of social choice functions, so-called majoritarian (or C1) functions, only tak...
A tournament solution is a function that maps a tournament, i.e., a directed graph representing an a...
An important subclass of social choice functions, so-called majoritarian (or C1) functions, only tak...
Tournament solutions, i.e., functions that associate with each complete and asym-metric relation on ...
Tournament solutions provide methods for selecting the “best” alternatives from a tournament and hav...
Every tournament on 7 vertices is the majority relation of a 3-permutation profile, and there exist ...
Tournament solutions are frequently used to select winners from a set of alternatives based on pairw...
A voting situation, in which voters are asked to rank all candidates pair by pair, induces a tournam...
A tournament is any complete asymmetric relation over a finite set A of outcomes describing pairwise...