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Scott, Dana

Measurement structures and linear inequalities. (English) Zbl 0129.12102

J. Math. Psychol. 1, 233-247 (1964).
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Cited in 6 Reviews
Cited in 157 Documents

Keywords:

mathematical biology
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References:

[1] Adams, E. W.; Fagot, R. F., A model of riskless choice, (Rep. No. 4 (1956), Applied Mathematics and Statistics Laboratory, Stanford University) · Zbl 0205.49203
[2] Luce, R. D., Semi-orders and a theory of utility discrimination, Econometrica, 24, 178-191 (1956) · Zbl 0071.14006
[3] Luce, R. D.; Tukey, J. W., Simultaneous conjoint measurement: a new type of fundamental measurement, J. math. Psychol., 1, 1-27 (1964) · Zbl 0166.42201
[4] Kelley, J. L., Measures on Boolean algebras, Pacific J. Math., 18, 1165-1172 (1959) · Zbl 0087.04801
[5] Kraft, C. H.; Pratt, J. W.; Seidenberg, A., Intuitive probability on finite sets, Ann. Math. Statist., 30, 408-419 (1959) · Zbl 0173.19606
[6] (Kuhn, H. W.; Tucker, A. W., Linear inequalities and related systems. Linear inequalities and related systems, Annals of mathematics studies (1956)), No. 38 · Zbl 0072.37502
[7] Scott, D.; Suppes, P., Foundational aspects of theories of measurement, J. Symbolic Logic, 23, 113-128 (1958) · Zbl 0084.24603
[8] Suppes, P.; Zinnes, J. L., Basic measurement theory, (Handbook of mathematical psychology, Vol. 1 (1963), Wiley: Wiley New York), 1-76
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.