Investments, tenth edition
Risk Pooling and the Insurance Principle
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Risk pooling means merging uncorrelated, risky projects as a means to reduce risk. Applied to the insurance business, risk pooling entails selling many uncorrelated insurance policies. This application of risk pooling has come to be known as the insurance principle. Conventional wisdom holds that risk pooling reduces risk, and that such pooling is the driving force behind risk management for the insurance industry. But even brief reflection should convince you that risk pooling cannot be the entire story. How can adding bets that are independent of your other bets reduce your total expo- sure to risk? This would be little different from a gambler in Las Vegas arguing that a few more trips to the roulette table will reduce his total risk by diversifying his overall “port- folio” of wagers. You would immediately realize that the gambler now has more money at stake, and his overall potential swing in wealth is clearly wider: While his average gain or loss per bet may become more predictable as he repeatedly returns to the table, his total proceeds become less so. As we will see, the insurance principle is sometimes similarly misapplied to long-term investments by incorrectly extending what it implies about aver- age returns to predictions about total returns. Imagine a rich investor, Warren, who holds a $1 billion portfolio, P. The fraction of the portfolio invested in a risky asset, A, is y, leaving the fraction 1 2 y invested in the risk- free rate. Asset A ’s risk premium is R, and its standard deviation is s . From Equations 6.3 and 6.4, the risk premium of the complete portfolio P is R P 5 yR, its standard deviation is s
P 5 y s , and the Sharpe ratio is S P 5 R / s . Now Warren identifies another risky asset, B, with the same risk premium and standard deviation as A. Warren estimates that the correla- tion (and therefore covariance) between the two investments is zero, and he is intrigued at the potential this offers for risk reduction through diversification. Given the benefits that Warren anticipates from diversification, he decides to take a position in asset B equal in size to his existing position in asset A. He therefore transfers another fraction, y, of wealth from the risk-free asset to asset B. This leaves his total port- folio allocated as follows: The fraction y is still invested in asset A, an additional invest- ment of y is invested in B, and 1 2 2 y is in the risk-free asset. Notice that this strategy is *The material in this section is more challenging. It may be skipped without impairing the ability to understand later chapters. bod61671_ch07_205-255.indd 230 bod61671_ch07_205-255.indd 230 6/18/13 8:11 PM 6/18/13 8:11 PM Final PDF to printer
C H A P T E R 7 Optimal Risky Portfolios 231 analogous to pure risk pooling; Warren has taken on additional risky (albeit uncorrelated) bets, and his risky portfolio is larger than it was previously. We will denote Warren’s new portfolio as Z. We can compute the risk premium of portfolio Z from Equation 7.2, its variance from Equation 7.3, and thus its Sharpe ratio. Remember that capital R denotes the risk premium of each asset and the risk premium of the risk-free asset is zero. When calculating portfolio variance, we use the fact that covariance is zero. Thus, for Portfolio Z: R Z 5 yR 1 yR 1 (1 2 2y)0 5 2yR (double R
) s Z 2 5 y 2 s 2 1 y 2 s 2 1 0 5 2y 2 s
(double the variance of P) s
5 "s
2 5 ys"2 ( "2 5 1.41 times the standard deviation of P) S Z 5 R Z /s
5 2yR/(ys"2) 5 "2R/s ( "2 5 1.41 times Sharpe ratio of P) The good news from these results is that the Sharpe ratio of Z is higher than that of P by the factor "2. Its excess rate of return is double that of P, yet its standard deviation is only
"2 times larger. The bad news is that by increasing the scale of the risky investment, the standard deviation of the portfolio also increases by "2. We might now imagine that instead of two uncorrelated assets, Warren has access to many. Repeating our analysis, we would find that with n assets the Sharpe ratio under strategy Z increases (relative to its original value) by a factor of "n to "n 3 R/s. But the total risk of the pooling strategy Z will increase by the same multiple, to s "n. This analysis illustrates both the opportunities and limitations of pure risk pooling: Pooling increases the scale of the risky investment (from y to 2 y ) by adding an additional position in another, uncorrelated asset. This addition of another risky bet also increases the size of the risky budget. So risk pooling by itself does not reduce risk, despite the fact that it benefits from the lack of correlation across policies. The insurance principle tells us only that risk increases less than proportionally to the number of policies insured when the policies are uncorrelated; hence profitability—in this application, the Sharpe ratio—increases. But this effect does not actually reduce risk. This might limit the potential economies of scale of an ever-growing portfolio such as that of a large insurer. You can interpret each “asset” in our analysis as one insurance policy. Each policy written requires the insurance company to set aside additional capital to cover potential losses. The insurance company invests its capital until it needs to pay out on claims. Selling more policies entails increasing the total position in risky investments and therefore the capital that must be allocated to those policies. As the company invests in more uncorrelated assets (insurance policies), the Sharpe ratio continuously increases (which is good), but since more funds are invested in risky policies, the overall risk of the portfolio rises (which is bad). As the number of policies grows, the risk of the pool will certainly grow—despite “diversification” across policies. Eventually, that growing risk will overwhelm the company’s available capital. Insurance analysts often think in terms of probability of loss. Their mathematically cor- rect interpretation of the insurance principle is that the probability of loss declines with risk pooling. This interpretation relates to the fact that the Sharpe ratio (profitability) increases with risk pooling. But to equate the declining probability of loss to reduction in total risk is erroneous; the latter is measured by overall standard deviation, which increases with risk pooling. (Again, think about the gambler in Las Vegas. As he returns over and over again to the roulette table, the probability that he will lose becomes ever more certain, but the magnitude of potential dollar gains or losses becomes ever greater.) Thus risk pooling allows neither investors nor insurance companies to shed risk. However, the increase in risk can be overcome when risk pooling is augmented by risk sharing, as discussed in the next subsection. bod61671_ch07_205-255.indd 231 bod61671_ch07_205-255.indd 231 6/18/13 8:11 PM 6/18/13 8:11 PM Final PDF to printer |
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