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The Interpretation of the Geometric Mean: A Note

Published online by Cambridge University Press:  19 October 2009

Stewart Hodges  and
Stephen Schaefer
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Extract

It has been said [2,4,5,6,7, and 8], and it seems to be widely accepted, that the geometric mean of the price relatives of a group of securities can be interpreted as the return which would have been earned on a portfolio of those securities, managed continuously over time to maintain an equal money investment in each security. This is a theoretical concept which could not be implemented literally by a portfolio manager, but it can still be treated rigorously in a mathematical sense. In a recent paper in this journal Rothstein [8] defined continuous reallocation as the limiting case of a policy which does have an operational definition. He showed that the index corresponding to a policy of the equalization of dollar investments approaches the geometrically averaged index as its limiting value. We shall argue that this interpretation of the geometric mean is a misleading one, since it depends upon assumptions which imply serious market inefficiencies.

Type
Research Article
Information
Journal of Financial and Quantitative Analysis , Volume 9 , Issue 3 , June 1974 , pp. 497 - 504
Copyright
Copyright © School of Business Administration, University of Washington 1974

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References

REFERENCES

[1]Barrett, J.F., and Wright, D.J.. “A Note on the Random Nature of Stock Market Prices.” Cambridge: University of Cambridge, Department of Control Engineering Working Paper.CrossRefGoogle Scholar
[2]Fisher, L.Some New Stock-Market Indexes.” Journal of Business, vol. 39 (1966), pp. 191225.CrossRefGoogle Scholar
[3]Ito, K.Stochastic Integral.” Prac. Imp. Acad., vol. 20 (1948), Tokyo, pp. 519524.Google Scholar
[4]Jensen, M.C.Random Walks: Reality or Myth – Comment.” Financial Analysts Journal, vol. 23 (November–December 1967), pp. 7785.CrossRefGoogle Scholar
[5]Latané, H.A.; Tuttle, D.L.; and Young, W.E.. “Market Indexes and their Implications for Portfolio Management.” Financial Analysts Journal, vol. 27 (September–October 1971), pp. 7585.CrossRefGoogle Scholar
[6]Marks, P., and Stuart, A.. “An Arithmetic Version of the Financial Times Ordinary Share Index.” Journal of the Institute of Actuaries, vol. 97 (December 1971), pp. 297324.CrossRefGoogle Scholar
[7]Rich, C. D.The Rationale of the Use of the Geometric Average as an Investment Index.” Journal of the Institute of Actuaries, vol. 74 (1948), pp. 338339.CrossRefGoogle Scholar
[8]Rothstein, M.On Geometric and Arithmetic Portfolio Performance Indexes.” Journal of Financial and Quantitative Analysis, vol. 7 (September 1972), pp. 19831992.CrossRefGoogle Scholar