Author
Listed:
- G. Caginalp
- G. Constantine
Abstract
The following results are obtained, (i) It is possible to obtain a time series of market data {y(t)} in which the fluctuations in fundamental value have been compensated for. An objective test of the efficient market hypothesis (EMH), which would predict random correlations about a constant value, is thereby possible, (ii) A time series procedure can be used to determine the extent to which the differences in the data and the moving averages are significant. This provides a model of the form y(t)-y(t-l)=0.5{y(t- l)-y(t-2)}+ε(t)+0.8ε(r-1) where ε(t) is the error at time t, and the coefficients 0.5 and 0.8 are determined from the data. One concludes that today's price is not a random perturbation from yesterday's; rather, yesterday's rate of change is a significant predictor of today's rate of change. This confirms the concept of momentum that is crucial to market participants. (iii) The model provides out-of-sample predictions that can be tested statistically. (iv) The model and coefficients obtained in this way can be used to make predictions on laboratory experiments to establish an objective and quantitative link between the experiments and the market data. These methods circumvent the central difficulty in testing market data, namely, that changes in fundamentals obscure intrinsic trends and autocorrelations. This procedure is implemented by considering the ratio of two similar funds (Germany and Future Germany) with the same manager and performing a set of statistical tests that have excluded fluctuations in fundamental factors. For the entire data of the first 1149 days beginning with the introduction of the latter fund, a standard runs test indicates that the data is 29 standard deviations away from that which would be expected under a hypothesis of random fluctuations about the fundamental value. This and other tests provide strong evidence against the efficient market hypothesis and in favour of autocorrelations in the data. An ARIMA time series finds strong evidence (9.6 and 21.6 standard deviations in the two coefficients) that the data is described by a model that involves the first difference, indicating that momentum is the significant factor. The first quarter's data is used to make out-of-sample predictions for the second quarter with results that are significant to 3 standard deviations. Finally, the ARIMA model and coefficients are used to make predictions on laboratory experiments of Porter and Smith in which the intrinsic value is clear. The model's forecasts are decidedly more accurate than that of the null hypothesis of random fluctuations about the fundamental value.
Suggested Citation
G. Caginalp & G. Constantine, 1995.
"Statistical inference and modelling of momentum in stock prices,"
Applied Mathematical Finance, Taylor & Francis Journals, vol. 2(4), pages 225-242.
Handle:
RePEc:taf:apmtfi:v:2:y:1995:i:4:p:225-242
DOI: 10.1080/13504869500000012
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Citations
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Cited by:
- Caginalp, Gunduz & DeSantis, Mark & Sayrak, Akin, 2014.
"The nonlinear price dynamics of U.S. equity ETFs,"
Journal of Econometrics, Elsevier, vol. 183(2), pages 193-201.
- Kim man Lui & Terence T. L. Chong, 2013.
"Do Technical Analysts Outperform Novice Traders: Experimental Evidence,"
Economics Bulletin, AccessEcon, vol. 33(4), pages 3080-3087.
- Nguyen Tien Zung, 2017.
"Second order stochastic differential models for financial markets,"
Papers
1707.05419, arXiv.org.
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