Random walk hypothesis
The random walk hypothesis is a financial theory stating that stock market prices evolve according to a random walk (so price changes are random) and thus cannot be predicted.
History
[edit]The concept can be traced to French broker Jules Regnault who published a book in 1863, and then to French mathematician Louis Bachelier whose Ph.D. dissertation titled "The Theory of Speculation" (1900) included some remarkable insights and commentary. The same ideas were later developed by MIT Sloan School of Management professor Paul Cootner in his 1964 book The Random Character of Stock Market Prices.[1] The term was popularized by the 1973 book A Random Walk Down Wall Street by Burton Malkiel, a professor of economics at Princeton University,[2] and was used earlier in Eugene Fama's 1965 article "Random Walks In Stock Market Prices",[3] which was a less technical version of his Ph.D. thesis. The theory that stock prices move randomly was earlier proposed by Maurice Kendall in his 1953 paper, The Analysis of Economic Time Series, Part 1: Prices.[4] In 1993 in the Journal of Econometrics, K. Victor Chow and Karen C. Denning published a statistical tool (known as the Chow–Denning test) for checking whether a market follows the random walk hypothesis.[5]
Testing the hypothesis
[edit]Whether financial data can be considered a random walk is a venerable and challenging question. One of two possible results are obtained, the data does fall under random walk or the data does not. To investigate whether observed data follows a random walk, some methods or approaches have been proposed, for example, the variance ratio (VR) tests,[6] the Hurst exponent[7] and surrogate data testing.[8]
Burton G. Malkiel, an economics professor at Princeton University and author of A Random Walk Down Wall Street, performed a test where his students were given a hypothetical stock that was initially worth fifty dollars. The closing stock price for each day was determined by a coin flip. If the result was heads, the price would close a half point higher, but if the result was tails, it would close a half point lower. Thus, each time, the price had a fifty-fifty chance of closing higher or lower than the previous day. Cycles or trends were determined from the tests. Malkiel then took the results in chart and graph form to a chartist, a person who "seeks to predict future movements by seeking to interpret past patterns on the assumption that 'history tends to repeat itself'."[9] The chartist told Malkiel that they needed to immediately buy the stock. Since the coin flips were random, the fictitious stock had no overall trend. Malkiel argued that this indicates that the market and stocks could be just as random as flipping a coin.
Asset pricing with a random walk
[edit]Modelling asset prices with a random walk takes the form:
where
is a drift constant
is the standard deviation of the returns
is the change in time
is an i.i.d. random variable satisfying .
A non-random walk hypothesis
[edit]There are other economists, professors, and investors who believe that the market is predictable to some degree. These people believe that prices may move in trends and that the study of past prices can be used to forecast future price direction.[clarification needed Confusing Random and Independence?] There have been some economic studies that support this view, and a book has been written by two professors of economics that tries to prove the random walk hypothesis wrong.[10]
Martin Weber, a leading researcher in behavioural finance, has performed many tests and studies on finding trends in the stock market. In one of his key studies, he observed the stock market for ten years. Throughout that period, he looked at the market prices for noticeable trends and found that stocks with high price increases in the first five years tended to become under-performers in the following five years. Weber and other believers in the non-random walk hypothesis cite this as a key contributor and contradictor to the random walk hypothesis.[11]
Another test that Weber ran that contradicts the random walk hypothesis, was finding stocks that have had an upward revision for earnings outperform other stocks in the following six months. With this knowledge, investors can have an edge in predicting what stocks to pull out of the market and which stocks — the stocks with the upward revision — to leave in. Martin Weber’s studies detract from the random walk hypothesis, because according to Weber, there are trends and other tips to predicting the stock market.
Professors Andrew W. Lo and Archie Craig MacKinlay, professors of Finance at the MIT Sloan School of Management and the University of Pennsylvania, respectively, have also presented evidence that they believe shows the random walk hypothesis to be wrong. Their book A Non-Random Walk Down Wall Street, presents a number of tests and studies that reportedly support the view that there are trends in the stock market and that the stock market is somewhat predictable.[12]
One element of their evidence is the simple volatility-based specification test, which has a null hypothesis that states:
where
- is the log of the price of the asset at time
- is a drift constant
- is a random disturbance term where and for (this implies that and are independent since ).
To refute the hypothesis, they compare the variance of for different and compare the results to what would be expected for uncorrelated .[12] Lo and MacKinlay have authored a paper, the adaptive market hypothesis, which puts forth another way of looking at the predictability of price changes.[13]
Peter Lynch, a mutual fund manager at Fidelity Investments, has argued that the random walk hypothesis is contradictory to the efficient market hypothesis -- though both concepts are widely taught in business schools without seeming awareness of a contradiction. If asset prices are rational and based on all available data as the efficient market hypothesis proposes, then fluctuations in asset price are not random. But if the random walk hypothesis is valid then asset prices are not rational as the efficient market hypothesis proposes.[14]
References
[edit]- ^ Cootner, Paul H. (1964). The random character of stock market prices. MIT Press. ISBN 978-0-262-03009-0.
- ^ Malkiel, Burton G. (1973). A Random Walk Down Wall Street (6th ed.). W.W. Norton & Company, Inc. ISBN 978-0-393-06245-8.
- ^ Fama, Eugene F. (September–October 1965). "Random Walks In Stock Market Prices". Financial Analysts Journal. 21 (5): 55–59. doi:10.2469/faj.v21.n5.55. Retrieved 2008-03-21.
- ^ Kendall, M. G.; Bradford Hill, A (1953). "The Analysis of Economic Time-Series-Part I: Prices". Journal of the Royal Statistical Society. A (General). 116 (1): 11–34. doi:10.2307/2980947. JSTOR 2980947.
- ^ Chow, K.Victor; Denning, Karen C. (August 1993). "A simple multiple variance ratio test". Journal of Econometrics. 58 (3): 385–401. doi:10.1016/0304-4076(93)90051-6.
- ^ A.W. Lo; A.C. MacKinlay (1989). "The size and power of the variance ratio test in finite samples: a Monte Carlo investigation". Journal of Econometrics. 40: 203–238. doi:10.1016/0304-4076(89)90083-3.
- ^ Jens Feder (1988). Fractals. Springer. ISBN 9780306428517.
- ^ T. Nakamura; M. Small (2007). "Tests of the random walk hypothesis for financial data". Physica A. 377 (2): 599–615. Bibcode:2007PhyA..377..599N. doi:10.1016/j.physa.2006.10.073.
- ^ Keane, Simon M. (1983). Stock Market Efficiency. Philip Allan Limited. ISBN 978-0-86003-619-7.
- ^ Lo, Andrew (1999). A Non-Random Walk Down Wall Street. Princeton University Press. ISBN 978-0-691-05774-3.
- ^ Fromlet, Hubert (July 2001). "Behavioral Finance-Theory and Practical Application". Business Economics: 63.
- ^ a b Lo, Andrew W.; Mackinlay, Archie Craig (2002). A Non-Random Walk Down Wall Street (5th ed.). Princeton University Press. pp. 4–47. ISBN 978-0-691-09256-0.
- ^ Lo, Andrew W. "The adaptive markets hypothesis: Market efficiency from an evolutionary perspective." Journal of Portfolio Management, Forthcoming (2004).
- ^ Lynch, Peter (1989). One Up On Wall Street. New York, NY: Simon & Schuster Paperback. ISBN 978-0-671-66103-8.