A superlative index number formula for the Hicks-Moorsteen productivity index
Hideyuki Mizobuchi ()
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Hideyuki Mizobuchi: Faculty of Economics, Ryukoku University
Journal of Productivity Analysis, 2017, vol. 48, issue 2, No 5, 167-178
Abstract:
Abstract The Malmquist and Hicks-Moorsteen productivity indexes are the two most widely used theoretical indexes for measuring productivity growth. Since these productivity indexes are defined by unknown distance functions, it is necessary to estimate the distance functions to compute them in principle. On the other hand, the Törnqvist productivity index is an empirical index number formula that is directly computable from the prices and quantities of the inputs and outputs alone. Caves et al. (1982) imply that the Malmquist index coincides with the Törnqvist index under profit maximizing behaviour and constant returns to scale technology. The purpose of the present paper is to point out that the Hicks-Moorsteen productivity index coincides with the Törnqvist productivity index under the same condition. We emphasize that the condition of constant returns to scale is indispensable for deriving the equivalence between the two indexes. Moreover, even when this condition is relaxed to the α returns to scale, the equivalence between the Hicks-Moorsteen and Törnqvist productivity indexes is shown to hold true.
Keywords: Törnqvist productivity index; Hicks-Moorsteen productivity index; Malmquist productivity index; Translog functional form; Superlative index number; α returns to scale (search for similar items in EconPapers)
Date: 2017
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Citations: View citations in EconPapers (8)
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DOI: 10.1007/s11123-017-0514-6
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