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Sh:816

Shelah, S. (2009). What majority decisions are possible. Discrete Math., 309(8), 2349–2364. arXiv: math/0405119 DOI: 10.1016/j.disc.2008.05.010 MR: 2510361
Abstract:
Suppose we are given a family of choice functions on pairs from a given finite set (with at least three elements) closed under permutations of the given set. The set is considered the set of alternatives (say candidates for an office). The question is, what are the choice functions \mathbf c on pairs of this set of the following form: for some (finite) family of “voters", each having a preference, i.e., a choice from each pair from the given family, \mathbf c\{x,y\} is chosen by the preference of the majority of voters. We give full characterization.
Version 2008-09-25_10 (34p) published version (16p)

Bib entry

@article{Sh:816,
 author = {Shelah, Saharon},
 title = {{What majority decisions are possible}},
 journal = {Discrete Math.},
 fjournal = {Discrete Mathematics},
 volume = {309},
 number = {8},
 year = {2009},
 pages = {2349--2364},
 issn = {0012-365X},
 mrnumber = {2510361},
 mrclass = {91B14},
 doi = {10.1016/j.disc.2008.05.010},
 note = {\href{https://arxiv.org/abs/math/0405119}{arXiv: math/0405119}},
 arxiv_number = {math/0405119}
}