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Ordinal ranking and intensity of preference: A linear programming approach. (English) Zbl 0618.90003

Recently, the authors [ibid. 31, 26-32 (1985; Zbl 0608.90003)] presented a model for representing ordinal preference rankings, where the voter can express intensity or degree of preference. The concensus of a set of m rankings is that ranking whose distance from this set is minimal. The consensus problem is then shown to be an integer programming problem with a piecewise linear convex objective function. In the present note we prove that the constraint matrix for this integer problem is totally unimodular. In addition, it is shown that the problem can be expressed as an equivalent integer linear programming problem. These two facts allow us to represent the consensus problem as a linear programming model. To further facilitate an efficient solution procedure to the consensus problem, it is shown that the number of columns in the L.P. model can generally be reduced significantly. Computational results on a wide range of problems is presented.

MSC:

91B08 Individual preferences
90C10 Integer programming
91B10 Group preferences
90C90 Applications of mathematical programming

Citations:

Zbl 0608.90003
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