Landau set

In voting systems, the Landau set (or uncovered set, or Fishburn set) is the set of candidates $x$ such that for every other candidate $z$ , there is some candidate $y$ (possibly the same as $x$ or $z$ ) such that $y$ is not preferred to $x$ and $z$ is not preferred to $y$ . In notation, $x$ is in the Landau set if $\forall \,z$ , $\exists \,y$ , $x\geq y\geq z$ .

The Landau set is a nonempty subset of the Smith set. It was discovered by Nicholas Miller.

References

Nicholas R. Miller, "Graph-theoretical approaches to the theory of voting", American Journal of Political Science, Vol. 21 (1977), pp. 769–803.
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.
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.
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.

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