Landau set
Template:Short description In the study of electoral systems, the uncovered set (also called the Landau set or the Fishburn set) is a set of candidates that generalizes the notion of a Condorcet winner whenever there is a Condorcet paradox.[1] The Landau set can be thought of as the Pareto frontier for a set of candidates, when the frontier is determined by pairwise victories.[2]
The Landau set is a nonempty subset of the Smith set. It was first discovered by Nicholas Miller.[2]
The Landau set consists of all undominated or uncovered candidates. One candidate (the Fishburn winner) is said to cover another (the Fishburn loser) if they would win any matchup the Fishburn loser would win. Thus, the Fishburn winner has all the pairwise victories of the Fishburn loser, and also at least one other pairwise victory.
References
- Nicholas R. Miller, "Graph-theoretical approaches to the theory of voting", American Journal of Political Science, Vol. 21 (1977), pp. 769–803. Script error: No such module "doi".. JSTOR 2110736.
- Nicholas R. Miller, "A new solution set for tournaments and majority voting: further graph-theoretic approaches to majority voting", American Journal of Political Science, Vol. 24 (1980), pp. 68–96. Script error: No such module "doi".. JSTOR 2110925.
- Norman J. Schofield, "Social Choice and Democracy", Springer-Verlag: Berlin, 1985.
- Philip D. Straffin, "Spatial models of power and voting outcomes", in Applications of Combinatorics and Graph Theory to the Biological and Social Sciences, Springer: New York-Berlin, 1989, pp. 315–335.
- Elizabeth Maggie Penn, "Alternate definitions of the uncovered set and their implications", 2004.
- Nicholas R. Miller, "In search of the uncovered set", Political Analysis, 15:1 (2007), pp. 21–45. Script error: No such module "doi".. JSTOR 25791876.
- William T. Bianco, Ivan Jeliazkov, and Itai Sened, "The uncovered set and the limits of legislative action", Political Analysis, Vol. 12, No. 3 (2004), pp. 256–276. Script error: No such module "doi".. JSTOR 25791775.