Measurement Scales on the Continuum
- 19 June 1987
- journal article
- Published by American Association for the Advancement of Science (AAAS) in Science
- Vol. 236 (4808) , 1527-1532
- https://doi.org/10.1126/science.236.4808.1527
Abstract
In a seminal article in 1946, S. S. Stevens noted that the numerical measures then in common use exhibited three admissible groups of transformations: similarity, affine, and monotonic. Until recently, it was unclear what other scale types are possible. For situations on the continuum that are homogeneous (that is, objects are not distinguishable by their properties), the possibilities are essentially these three plus another type lying between the first two. These types lead to clearly described classes of structures that can, in principle, be incorporated into the classical structure of physical units. Such results, along with characterizations of important special cases, are potentially useful in the behavioral and social sciences.Keywords
This publication has 16 references indexed in Scilit:
- A classification of all order-preserving homeomorphism groups of the reals that satisfy finite uniquenessJournal of Mathematical Psychology, 1987
- Uniqueness and homogeneity of ordered relational structuresJournal of Mathematical Psychology, 1986
- Factorizable automorphisms in solvable conjoint structures IJournal of Pure and Applied Algebra, 1983
- On the scales of measurementJournal of Mathematical Psychology, 1981
- Fundamental unit structures: A theory of ratio scalabilityJournal of Mathematical Psychology, 1979
- Prospect Theory: An Analysis of Decision under RiskEconometrica, 1979
- Dimensionally Invariant Numerical Laws Correspond to Meaningful Qualitative RelationsPhilosophy of Science, 1978
- Simultaneous conjoint measurement: A new type of fundamental measurementJournal of Mathematical Psychology, 1964
- A general theory of measurement applications to utilityNaval Research Logistics Quarterly, 1959
- On the Theory of Scales of MeasurementScience, 1946