Abstract
Positionalist voting functions are those social choice functions where the positions of the alternatives in the voter's preference orders crucially influence the social ordering of the alternatives. An important subclass consists of those voting functions where numbers are assigned to the alternatives in the preference orders and the social ordering is computed from these numbers. Such voting functions are called representable. Various well-known conditions for voting functions are introduced and it is investigated which representable voting functions satisfy these conditions. It is shown that no representable voting function satisfies the Condorcet criterion. This condition and Arrow's independence condition, which are typical non-positionalist conditions, are shown to be incompatible. The Borda function, which is a well-known positionalist voting function, is studied extensively, conditions uniquely characterizing it are given and some modifications of the function are investigated.
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My thanks are due to professor Bengt Hansson for encouragement and several helpful suggestions.
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Gärdenfors, P. Positionalist voting functions. Theor Decis 4, 1–24 (1973). https://doi.org/10.1007/BF00133396
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DOI: https://doi.org/10.1007/BF00133396