Minimizing the classical definition of risk should be a counterintuitive venture as the explanatory nature of historical metrics’ construction challenges their ability to serve a predictive purpose on a non-stationary process. We uncover an ill-conceived bias in these metrics and discover that they provide a contrary indication to an investment’s survivability. The breakdown in the explanatory-predictive link is troubling and we aim to correct this via a better derived explanatory metric. The predictive variant of our metric will directly question the notion of optimization in order to serve the first priority of any continuous system, survival.
Was the financial crisis of 2008 really an anomaly or was the preceding era of complacent volatility the true anomaly? This historically low volatility environment fostered a false positive in the minds of many risk managers. We have tamed the beast as it were. With the advent of value-at-risk (VaR) and other newly accepted risk management techniques, it was actually possible to figure out how much one could lose in a given day and contain volatility. That is if nothing happened. And nothing did happen for quite a while. This muted entropy created a reflexive feedback loop of ignorance. The first event was the Long Term Capital Management failure in 1998. Instead of losing a maximum of $50 million a day according to VaR, the fund started losing $500 million a day soon after the Russian bond default. Then in June of 2007, the next shoe dropped. Two Bear Sterns hedge funds, the Bear Stearns High-Grade Structured Credit Fund and the Bear Sterns High-Grade Structured Credit Enhanced Fund both needed bail outs. Risk managers’ models throughout the industry viewed these events as “tail events” thus believing a mean reversion to perceived normalcy would surely follow. The ensuing bifurcation over the next 18 months decimated any and all risk models that had been constructed and optimized on these experimental parameters which were devoid of any common sense assumptions.
Lopes and Oden [
Performance measures provide us with the age old argument of explanatory versus predictive, to optimize or not. Milton Friedman [
MPT measures have been scrutinized for decades. The low hanging fruit has already been picked. Post Modern Portfolio Theory (PMPT), using downside deviation, evolved and merely refined a flawed thought process. In a nescient blessing, MPT is marginally better conceived because it uses standard deviation, which encompasses the entire distribution, even though it assumes a Gaussian distribution. However, neither model defines volatility expeditiously, regardless of distributional assumptions. A Brownian Motion (Wiener) process illustrates the effects of time on cumulative volatility. The effect of a proportional increase in volatility as time increases has been lost on all of the historical return/risk measures. The fact that standard deviation, variance or semi-variance, is used in the denominator and mean returns are used in the numerator creates ratios that have a natural tendency to decline over time. The mean return, it is argued, should be able to overcome that headwind, illustrating a superior investment. It is not only where you wind up, but how you get there that will illustrate a superior investment.
The issue is that benefit-cost analysis such as the Treynor ratio, Sharpe Ratio, Jensen’s Alpha, reward to semivariability ratio, Mean/Lower Partial Moment (LPM) ratio all utilize standard deviation, beta or below target semivariance solely in their denominator. Jensen’s Alpha utilizes the portfolio Beta as a multiplier in its computation, therefore succumbing to the unequal treatment of volatility. The other measures using the mean return or any other averaging metric does not offer an adequate substitute for the observed upside volatility in the numerator. An observation at time t is not transitive, it cannot simultaneously be a gain and a loss. If a result is below a target, it is a negative utility result to the investor. The use of mean in the numerator and a positive target for semivariance in the denominator for example, will generate these logical violations where the same observation is being used in a conflicting manner.
Given an opportunity cost such as a risk-free rate of return, the semivariance will compute the volatility of returns below this opportunity cost (target return). The mean return in the numerator is an expected benefit of holding the investment but it will include returns below the opportunity cost. The benefit in the numerator should not include below target returns. Therefore, the proper measure of an investment’s benefits will only include returns that are above the target return. We propose the Upper Partial Moment (UPM) because it will only include returns that are above the target return and the use of a UPM/LPM ratio because it discriminates between a benefit and a cost.
Stochastic Dominance was a promising methodology of ordering since volatility itself is a stochastic process, but fails due to its reliance on cumulative distribution functions which only consider below target probabilities1. We have noted that there are very different connotations between above target gains and below target losses. Stochastic dominance also requires an underlying stationarity assumption that is not consistent with real life observations.
Value at Risk (VaR) which calculates its thresholds from the distribution of historical portfolio returns does not consider an increase in distribution volatility which would extend observed thresholds. In fact, VaR offers less predictive value than a 0 degree Lower Partial Moment (LPM) calculation. Tee [
To summarize, previous financial crises have demonstrated the insufficiencies of historical measures. Most measures also have no utility theory support, assuming linear utility functions above the target return, and are completely backwards looking in- sample. The “ill-conceived bias” is the fact a single observation is used for both “Risk” and “Return” considerations. VaR fails as a risk metric because it is not based on any notion of utility theory (and has been rejected by Markowitz [
Ang and Chua [
Partial moments are well integrated into expected utility theory as developed in the literature by Friedman and Savage [
The formulas representing the n-degree LPM and q-degree UPM are:
where Ri,t represents the returns of the investment i at time t, n is the degree of the LPM, q is the degree of the UPM, h is the target for computing below target returns, and l is the target for computing above target returns3.
Below target analysis alone is akin to only hiring a defensive coordinator. Yes, defense wins championships and is arguably more important to survival than offense which is why our metric allows for the asymmetry of these notions via the degree used in the computations (representative of an investors fear and greed levels). This is an instance where an investor places more weight on below target outcomes rather than on above target outcomes, n > q.
This view was recently expressed by Warren Buffet [
“…Second, though we have lagged the S&P in some years that were positive from the market, we have consistently done better than the S&P in the eleven years during which it delivered negative results. In other words, our defense has been better than our offense, and that’s likely to continue.” (Buffett [
Diversification is the panacea of risk management techniques. Does it accomplish what it is designed to do, i.e., reduce the non-systemic risk relative to an individual position? Yes. How does it achieve this? Well, the answer may not be as comforting as one would think. The preferred method to reduce non-systemic risk is to add investments with the greatest historical marginal non systemic risk net of systemic risk. Historical analysis has shown that a portfolio of at least 20 stocks will diversify away the non-sys- temic risk. It is essentially fighting fire with fire. This has been quantified by subtracting the systemic benchmark from the total downside risk of the investment as in Equation (3). At this point going forward, we will substitute x for Ri which is the return for an individual investment and y for a benchmark return, Rb which can be a fixed income asset return or a stock market index return such as the CRSP index.
Non-systemic risk is risk that is specific to an asset or a small group of assets net of general market effects. To compute it, first we use a total risk computation such as Equation (1) which uses a target (h) specific to that individual such as the Rf or the individual’s cost of capital. This computation ignores any effects from the market or systemic risk. Non-systemic risk is eliminated through diversification. But, in diversifying, we increase the systemic risk, which is described in the immediate paragraph above. The next part of the equation describes how to remove the systemic risk by subtracting the UPM/LPM of the systemic benchmark (y) from the total risk of the investment (x) using the same target (h) in order to achieve the net non-systemic risk.
To effectively calculate the marginal risk, the same target h must be used for both the investment x and the market benchmark y. We can consolidate this Equation (3) to generate the UPM/LPM for the investment (x) using the systemic benchmark as the target (y) to ascertain how much non-systemic risk an investment has net of the systemic effects, as presented in Equation (4).
This leads to the quandary faced by all risk metrics, what is the systemic benchmark and how does one properly quantify it? This is subjective to say the least and can vary from investor to investor. We are not as brazen as some authors of historical measures and do not purport to have an answer to this. There are certain variables an individual must implement that match their unique composition. A more durable service is to offer a framework capable of being as unique as the individual utilizing it. Our metric also avoids any philosophical inconsistencies by using the same target for gains and losses.
An overwhelming majority of investors use the S&P 500 index as a proxy for systemic risk. While tempting, it is not a complete measure of the asset class thus we cannot implicitly support its use as a proxy for systemic risk for an equity investment. However, the particular topic is beyond the scope of this paper4. For individual security analysis the target is a bit more intricate. A double non-stationary benchmark is used: the asset class benchmark and the risk free rate of return. The greater of the two observations at time t will be the target for that particular period’s partial moment derivation. This will address the aggregate asset class compared to the opportunity cost of investing in the risk free alternative simultaneously. Equation (4) with a double non-stationary conditional target, the asset class benchmark and the risk free rate will capture this allocation consideration.
This ratio answers the question when comparing and ranking multiple investments- What investment historically goes up more than the market when the market goes up and historically loses less when the market loses? That’s great for explanatory historical analysis, but what about future predictive capacity?
“Risk can be greatly reduced by concentrating on only a few holdings.”
Warren Buffett
The intended reduction in non-systemic risk comes with the hefty price of increased exposure to systemic risk. In times of increased entropy or even crisis, cross correlations of securities tend towards 1, effectively rendering the diversification useless and augmenting one’s losses. The axiom was developed “throwing the baby out with the bath water,” noting this very situation. Li’s copula, a formula widely used in analysis to construct CDOs failed due to its ignorance of these dynamic correlations in times of crisis and an underlying assumption of a Gaussian distribution for those correlations5.
So we have maximized our additional non-systemic risk based off of our explanatory model. Now we have to deal with the dormant beast: systemic risk. Autocorrelation/ dependence/serial correlation (ρ(x)) is an important tool in identifying increasing distributional risks such as muted entropic environments and lending a predictive ability to an explanatory metric. When investing in a fund, the autocorrelation is quite useful in picking up on discretionary marks used by the manager in illiquid securities with the attempt to smooth out returns, unmasking the layer of uncertainty presented to the investor. The predictive ability is crucial to avoiding ensuing bifurcation disruptions which are not as exogenous or infrequent as one would assume. Benoit Mandelbrot6 coined the term “Joseph Effect”, alluding to the Old Testament story of seven years feast fol- lowed by seven years of famine for Egypt. While a mathematician’s experimental prob- ability model would suggest year eight should be of equal or greater feast to year seven, the observed autocorrelation incorporated into our model will sound alarm bells well before. The autocorrelation formula for a 1 period lag is for investment x at time t is:
Taking the absolute value…
The absolute value is used because an autocorrelation of −1 or 1 is equally dangerous to investors. In the −1 instance the mean from the target would be zero for a period of observed autocorrelation of −1 and there would be an equally likely series of above or below target results, a true guess
A 1 period lag is used because we aim to err on the side of caution. Where there’s smoke there’s fire. If a 10 period lag presents autocorrelation, it will obviously be noticed in the 1 period prior. The risk is that between lag differences, a bifurcation abruptly ceases thus leaving the investor waiting for a confirmation to avoid the very event that has just transpired, effectively rendering this metric explanatory. Russell Ackoff [
“A more difficult decision for us was how to measure the progress of Berkshire versus the S&P. There are good arguments for simply using the change in our stock price. Over an extended period of time, in fact, this is the best test. But year-to-year market prices can be extraordinarily erratic. Even evaluations covering as long as a decade can be distorted by foolishly high or low prices at the beginning or end of the measurement period.” (Buffett [
When evaluating an individual security, a more complete analysis as shown in
Similar to a “bubble” or parabolic move7, an observed 1 autocorrelation reading denotes a dubious situation. The increased autocorrelation influence can be subtracted from itself to compensate for an increased likelihood of an unstable investment, thus lowering the metric to reflect this probable risk. Bubbles are good until they burst. George Soros explains that bubbles and his participation in them are what provided him with his vast wealth8. The trick is knowing when to exit prior to the bubble bursting. Equation (7) is our predictive metric using the autocorrelation coefficient.
An example may help illustrate the goal of the predictive element. If you enter an investment based on its historical explanatory risk metric of 100 shares and its autocorrelation is zero then you retain your 100 shares. Say the investment performs well and its autocorrelation reaches 0.5. The metric will have decreased by 0.5, forcing you to cut your holdings by 50% to match the potential risks the autocorrelation is measuring. Say the investment skyrockets and the next period of review for your investment, you find that the autocorrelation is now 1. This would yield a result of zero to the predictive metric suggesting you sell your remaining shares. It is not intended to pick an inflection point (since one never knows the top until after they have seen it), but the translation to deltas onto your position will properly manage anticipated risks. The ranking of their investments based on the predictive metric is another means an investor can transact on the autocorrelation concerns. In the preceding example, if an investment’s metric is cut by half upon the investor’s first review, then replacing the investment with a senior ranked investment is a viable interpretation of the data.
Unfortunately the inverse does not hold for negative autocorrelation. While the “bubble” example above will protect profits, entering a position based on the negative autocorrelation will be akin to the “catching a falling knife” axiom. This metric avoids this as well as the pitfalls of irrationality. Keynes9 famously noted, “The market can stay irrational longer than you can stay solvent” and since our metric does not predict an inflection point, let it stay irrational. In essence it’s a long only strategy with the entry at zero autocorrelation and the full exit at absolute value 1.
The dynamic positioning example also highlights an important shortcoming of passive investing. Coupled with diversification (which we have just explained tends to have the inverse effect when one really needs it), buying and holding a diverse portfolio has been preached ad nauseam as a means of mitigating risk. In a 1991 journal piece, William Sharpe [
To summarize, our explanatory and predictive measures are as follows:
EXPLANATORY PREDICTIVE
Our empirical test generates rank correlations between the performance measures and asset returns for both an explanatory period and an out-of-sample predictive period. On balance, we were able to generate minimal explanatory correlations with no out-of- sample predictive correlations using the explanatory model and no explanatory correlations with significant out-of-sample correlations when using the predictive model. MPT metrics similarly offered sparse explanatory and predictive correlations. Our security universe consisted of approximately 300 surviving S&P 500 companies for three 11-year periods: January 1978-January 1989; January 1988-January 1999; and January 1998-January 2009. Each period represents different economic conditions but all three are difficult market periods. Figures 2-4 graphically portray the S&P 500 performance for each of our three periods to highlight what we are trying to predict and the associated subset utilized to accomplish that goal. Figures 2-4 demonstrate both a one year and a two year out-of-sample period.
UPM/LPM metric correlated against the holding period mean return. This correlation is where we would expect the significant ex ante efficiency. The asset class benchmark used in our explanatory and predictive metric is the CRSP market cap index which we use to proxy systemic risk. It is used in the double non-stationary conditional benchmark along with the non-stationary 3-month Treasury Bill rate for individual equities.
In the following tables (Tables 1-6), we present four different classifications of investor types and their associated risk profiles: Risk Averse, whereby the gain sensitivity exponent q will be less than the loss sensitivity exponent n, (q: n = 0.25); Prospect Theory, (q: n = 0.44)11; Risk Neutral (q: n = 1); and Risk Seeking (q: n = 2). With the
exception of Prospect Theory and Risk Neutral, these ratios are by no means stationary. Individuals can and do alter their risk profile which leads to the creation of a sum over histories for personal utility. For brevity, we increase the loss sensitivity exponent n by 1 in each classification to illustrate the heightened sensitivities within each classification.
The more sensitive the investor (an increased loss sensitivity exponent n or gain sensitivity exponent q), the greater correlations of our predictive metric with out-of-sam- ple rankings for one and two year holding periods. Two year holding periods also provide the most significant ex ante correlations, likely due to the systemic events present in each period. In period 1, the Crash of ’87 was in the two year holding period. In period 2, the Asian Financial Crisis/Russian Debt Crisis was in the two year holding period. Period 2 was also the only to end at its highs for the sample period, as if the systemic event were truly just a blip. Our period 2 ex ante correlations began exhibiting inverse significant results 14 months prior to the peak of the Nasdaq for both 1 and 2 year holding periods. Upon consideration, we could not be more pleased with this as
the Rho present in the obvious bubble was accurately being reflected in our predictive metric, prior to its bursting. This unique “mid bubble” data set fully supported equation 7’s goal, to avoid bifurcations (in this instance a 78% decline from March 2000 through September 2002).
Finally, in period 3 the 2007-2009 Financial Crisis was accounted for in that two year holding period. It should be mentioned that the explanatory subset of period 3 data contains the bursting of the Nasdaq bubble, which on a percentage basis dwarfs all other systemic events in our study to which all explanatory metrics had the equal opportunity to absorb and account for.
Explanatory MPT/PMPT metrics did offer a universal conclusion-they offered no statistically significant correlations during the holding period (with the exception of the R/V ratio in the one year holding in period 1). During the explanatory period, the results varied from period to period, and MPT/PMPT measure to MPT/PMPT measure.
In Period 1 (January 1978-January 1989,
Begin Historic | 1 | January 1978 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 121 | January 1988 | |||||||
Begin Holding | 122 | February 1988 | |||||||
End Holding | 133 | January 1989 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.0237 | 0.1035 | |||||||
(0.3790) | |||||||||
Jensen Alpha | 0.0586 | (1.6652)* | |||||||
(−0.7492) | (0.9399) | ||||||||
R/SV | 0.1010 | −0.0115 | |||||||
(1.6243) | (−0.1838) | ||||||||
R/B | 0.0396 | 0.0449 | |||||||
(0.6346) | (0.7190) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM0.3/LPM1.0 | 0.0013 | −0.0855 | −0.0051 | 0.0881 | UPM1.0/LPM1.0 | −0.0239 | 0.0757 | −0.0179 | 0.0996 |
(0.0216) | (−1.3729) | (−0.0819) | (1.4148) | (−0.3833) | (1.2149) | (−0.2865) | (1.6022) | ||
UPM .5/LPM2.0 | 0.0503 | −0.1598 | −0.0015 | 0.0803 | UPM2.0/LPM2.0 | −0.0449 | −0.0053 | 0.0050 | 0.1049 |
(0.8055) | (−2.5909)*** | (−0.0245) | (1.2886) | (−0.7198) | (−0.0841) | (0.0793) | (1.6873)* | ||
UPM .8/LPM3.0 | 0.1355 | 0.0297 | −0.0370 | 0.0813 | UPM3.0/LPM3.0 | −0.0540 | −0.0520 | 0.0116 | 0.1168 |
(2.1884)*** | (0.4746) | (−0.5928) | (1.3059) | (−0.8653) | (−0.8338) | (0.1856) | (1.8813)* | ||
UPM1.0/LPM4.0 | 0.0178 | −0.0745 | −0.0359 | 0.0818 | UPM4.0/LPM4.0 | 0.0600 | −0.0118 | 0.0160 | 0.1292 |
(0.2855) | (−1.1961) | (−0.5755) | (1.3131) | (0.9619) | (−0.1880) | (0.2555) | (2.0843)** | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | 0.0844 | −0.0179 | −0.0051 | 0.0964 | UPM2.0/LPM1.0 | 0.0594 | −0.0905 | 0.0147 | 0.0999 |
(1.3560) | (−0.2858) | (−0.0823) | (1.5491) | (0.9523) | (−1.4535) | (0.2360) | (1.6064) | ||
UPM .9/LPM2.0 | 0.1103 | −0.0758 | −0.0055 | 0.1255 | UPM4.0/LPM2.0 | −.0255 | −.0517 | −.0195 | 0.1045 |
(1.7757)* | (−1.2162) | (−0.0872) | (2.0240)* | (−0.4082) | (−0.8277) | (−0.3120) | (1.6817)* | ||
UPM .9/LPM2.0 | 0.0942 | −0.0668 | 0.0154 | 0.0731 | UPM6.0/LPM3.0 | −0.0277 | −0.0256 | −0.0133 | 0.0904 |
(1.5132) | (−1.0705) | (0.2462) | (1.1724) | (−0.4427) | (−0.4093) | (−0.2122) | (1.4520) | ||
UPM1.8/LPM4.0 | −0.0510 | −0.0630 | −0.0497 | 0.1036 | UPM8.0/LPM4.0 | 0.0362 | −0.0718 | 0.0002 | 0.1205 |
(−0.8176) | (−1.0105) | (−0.7963) | (1.6661)* | (0.5798) | (−1.1513) | (0.0033) | (1.9426)* |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
Begin Historic | 1 | January 1978 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 109 | January 1987 | |||||||
Begin Holding | 110 | February 1987 | |||||||
End Holding | 133 | January 1989 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.0776 | 0.0322 | |||||||
(1.2453) | (0.5152) | ||||||||
Jensen Alpha | −0.0480 | 0.0240 | |||||||
(−0.7689) | (0.3835) | ||||||||
R/SV | 0.0340 | −0.0689 | |||||||
(0.5443) | (−1.1058) | ||||||||
R/B | −0.1145 | 0.0628 | |||||||
(−1.8436)* | (1.0073) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM0.3/LPM1.0 | 0.0295 | −0.0521 | −0.0794 | 0.1761 | UPM1.0/LPM1.0 | −0.0492 | −0.0485 | −0.0825 | 0.1930 |
(0.4717) | (−0.8350) | (−1.2749) | (2.8619)*** | (−0.7881) | (−0.7776) | (−1.3250) | (3.1469)*** | ||
UPM .5/LPM2.0 | −0.0310 | −0.0475 | −0.0430 | 0.2161 | UPM2.0/LPM2.0 | −0.0438 | −0.0759 | −0.0595 | 0.2120 |
(−0.4970) | (−0.7611) | (−0.6892) | (3.5412)*** | (−0.7016) | (−1.2184) | (−0.9533) | (3.4700)*** | ||
UPM .8/LPM3.0 | −0.0300 | −0.0598 | −0.0419 | 0.2097 | UPM3.0/LPM3.0 | 0.0495 | −0.0977 | −0.0783 | 0.2245 |
(−0.4809) | (−0.9580) | (−0.6708) | (3.4319)*** | (0.7927) | (−1.5707) | (−1.2567) | (3.6866)*** | ||
UPM1.0/LPM4.0 | −0.0155 | −0.1627 | −0.1110 | 0.2007 | UPM4.0/LPM4.0 | −0.0586 | −0.0460 | −0.0918 | 0.2669 |
(−0.2486) | (−2.6388)*** | (−1.7865) | (3.2779)*** | (−0.9388) | (−0.7364) | (−1.4747) | (4.4312)*** | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | 0.0117 | −0.0890 | −0.0730 | 0.1749 | UPM2.0/LPM1.0 | 0.0607 | −0.1142 | −0.0616 | 0.2524 |
(0.1865) | (−1.4303) | (−1.1707) | (2.8428)*** | (0.9732) | (−1.8392)* | (−0.9881) | (4.1742)*** | ||
UPM .9/LPM2.0 | −0.0637 | −0.0540 | −0.0975 | 0.2373 | UPM4.0/LPM2.0 | 0.1186 | −0.0143 | −0.0644 | 0.1669 |
(−1.0207) | (−0.8651) | (−1.5681) | (3.9079)*** | (1.9105)* | (−0.2290) | (−1.0329) | (2.7084)*** | ||
UPM .9/LPM2.0 | 0.0664 | 0.0390 | −0.0816 | 0.2314 | UPM6.0/LPM3.0 | 0.0007 | −0.0183 | −0.0695 | 0.2141 |
(1.0652) | (0.6239) | (−1.3094) | (3.8053)*** | (0.0105) | (−0.2928) | (−1.1153) | (3.5068)*** | ||
UPM1.8/LPM4.0 | 0.0197 | −0.0255 | −0.0619 | 0.2331 | UPM8.0/LPM4.0 | 0.0703 | −0.0719 | −0.0838 | 0.1979 |
(0.3150) | (−0.4082) | (−0.9926) | (3.8360)*** | (1.1268) | (−1.1538) | (−1.3448) | (3.2303)*** |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
Begin Historic | 1 | January 1988 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 121 | January 1998 | |||||||
Begin Holding | 122 | February 1998 | |||||||
End Holding | 133 | January 1999 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.0668 | 0.0258 | |||||||
(1.1821) | (0.4559) | ||||||||
Jensen Alpha | 0.0141 | 0.0252 | |||||||
(0.2489) | (0.4461) | ||||||||
R/SV | 0.0358 | 0.0400 | |||||||
(0.6321) | (0.7070) | ||||||||
R/B | 0.0932 | −0.0118 | |||||||
(1.6538)* | (−0.2076) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM .3/LPM1.0 | −0.0058 | 0.1098 | 0.0211 | −0.0635 | UPM1.0/LPM1.0 | −0.0351 | −0.0124 | 0.0523 | −0.0746 |
(−0.1031) | (1.9519)* | (0.3734) | (−1.1237) | (−0.6212) | (−0.2197) | (0.9249) | (−1.3219) | ||
UPM .5/LPM2.0 | −0.0955 | 0.0668 | −0.0539 | −0.1011 | UPM2.0/LPM2.0 | 0.0220 | 0.0227 | 0.0329 | −0.0807 |
(−1.6953)* | (1.1823) | (−0.9537) | (−1.7945)* | (0.3891) | (0.4004) | (0.5816) | (−1.4308) | ||
UPM .8/LPM3.0 | −0.0310 | −0.0436 | −0.0437 | −0.0776 | UPM3.0/LPM3.0 | 0.0721 | 0.0916 | −0.0110 | −0.0637 |
(−0.5485) | (−0.7711) | (−0.7732) | (−1.3741) | (1.2764) | (1.6243) | (−0.1950) | (−1.1278) | ||
UPM1.0/LPM4.0 | −0.0279 | 0.0085 | 0.0184 | −0.0720 | UPM4.0/LPM4.0 | 0.0026 | 0.0954 | 0.0056 | −0.0842 |
(−0.4922) | (0.1506) | (0.3253) | (−1.2752) | (0.0452) | (1.6924)* | (0.0998) | (−1.4933) | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | 0.0029 | 0.0521 | 0.0131 | −0.0911 | UPM2.0/LPM1.0 | −0.0238 | −0.0316 | −0.0041 | −0.0730 |
(0.0521) | (0.9215) | (0.2309) | (−1.6161) | (−0.4201) | (−0.5587) | (−0.0718) | (1.2921) | ||
UPM .9/LPM2.0 | 0.0356 | −0.1113 | 0.0228 | −0.0863 | UPM4.0/LPM2.0 | −0.0057 | 0.1209 | −0.0092 | −0.0803 |
(0.6287) | (−1.9784)* | (0.4032) | (−1.5309) | (−0.1009) | (2.1516)** | (−0.1622) | (−1.4234) | ||
UPM .9/LPM2.0 | 0.0303 | 0.0714 | 0.0127 | −0.0738 | UPM6.0/LPM3.0 | −0.0676 | −0.0165 | −0.0429 | −0.0679 |
(0.5356) | (1.2637) | (0.2252) | (−1.3073) | (−1.1969) | (−0.2919) | (−0.7577) | (−1.2021) | ||
UPM1.8/LPM4.0 | 0.0749 | −0.0055 | 0.0173 | −0.0950 | UPM8.0/LPM4.0 | 0.0029 | 0.0412 | −0.0318 | −0.1002 |
(1.3272) | (−0.0968) | (0.3054) | (−1.6852)* | (0.0518) | (0.7276) | (−.5615) | (−10.7796)* |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for Rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
Begin Historic | 1 | January 1988 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 109 | January 1997 | |||||||
Begin Holding | 110 | February 1997 | |||||||
End Holding | 133 | January 1999 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.0652 | 0.0218 | |||||||
(1.1536) | (0.3858) | ||||||||
Jensen Alpha | 0.0980 | −0.0777 | |||||||
(1.7392)* | (−1.3773) | ||||||||
R/SV | −0.0021 | 0.0009 | |||||||
(−0.0370) | (0.0166) | ||||||||
R/B | 0.0216 | 0.0514 | |||||||
(0.3819) | (0.9086) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM .3/LPM1.0 | −0.0622 | 0.0695 | −0.0016 | −0.0974 | UPM10.0/LPM10.0 | −0.0177 | −0.0764 | 0.0549 | −0.0560 |
(−1.1003) | (1.2314) | (−0.0276) | (−1.7295)* | −0.3130) | (−10.3536) | (0.9705) | (−0.9915) | ||
UPM .5/LPM2.0 | −0.0487 | 0.0033 | −0.0053 | −0.0482 | UPM20.0/LPM20.0 | 0.0019 | −0.0244 | 0.0097 | −0.0512 |
(−0.8620) | (0.0584) | (−0.0939) | (−0.8528) | (0.0329) | (−0.4311) | (0.1722) | (−0.9049) | ||
UPM .8/LPM3.0 | −0.0983 | −0.0678 | 0.0096 | −0.1018 | UPM30.0/LPM30.0 | −0.0200 | −0.0454 | 0.0489 | −0.0939 |
(−1.7453)* | (−1.1995) | (0.1690) | (−1.8080)* | (−0.3531) | (−0.8034) | (0.8651) | (−10.6652)* | ||
UPM1.0/LPM4.0 | −0.0297 | 0.0308 | 0.0271 | −0.0983 | UPM40.0/LPM40.0 | 0.0447 | 0.0497 | 0.0156 | −0.0734 |
(−0.5250) | (0.5437) | (0.4786) | (−1.7439)* | (0.7909) | (0.8786) | (0.2761) | (−10.3003) | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | 0.0176 | 0.0347 | 0.0525 | −0.1079 | UPM20.0/LPM10.0 | −0.0265 | 0.0861 | 0.0539 | −0.1042 |
(0.3103) | (0.6136) | (0.9290) | (−1.9169)* | (−0.4690) | (10.5265) | (0.9528) | (−1.8503)* | ||
UPM .9/LPM2.0 | 0.0105 | 0.0664 | 0.0448 | −0.0711 | UPM40.0/LPM20.0 | 0.0364 | 0.0308 | 0.0265 | −0.1107 |
(0.1858) | (1.1755) | (0.7923) | (−1.2588) | (0.6429) | (0.5438) | (0.4691) | (−1.9667)* | ||
UPM .9/LPM2.0 | −0.0661 | 0.0574 | −0.0044 | −0.0660 | UPM60.0/LPM30.0 | −0.0085 | 0.0134 | 0.0181 | −0.0957 |
(−1.1708) | (1.0158) | (−0.0784) | (−1.1691) | (−0.1495) | (0.2362) | (0.3192) | (−1.6980)* | ||
UPM1.8/LPM4.0 | −0.1522 | 0.0324 | 0.0273 | −0.0902 | UPM80.0/LPM40.0 | 0.0509 | −0.0649 | −0.0011 | −0.0794 |
(−2.7207)*** | (0.5726) | (0.4829) | (−1.6000) | (0.9008) | (−10.1492) | (−0.0187) | (−1.4068) |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
Begin Historic | 1 | January 1998 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 121 | January 2008 | |||||||
Begin Holding | 122 | February 2008 | |||||||
End Holding | 133 | January 2009 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.0659 | −0.0128 | |||||||
(1.1272) | (−0.2175) | ||||||||
Jensen Alpha | 0.0793 | −0.0605 | |||||||
(1.3565) | (−1.0346) | ||||||||
R/SV | 0.0609 | −0.0389 | |||||||
(1.0402) | (−0.6642) | ||||||||
R/B | 0.1019 | 0.0342 | |||||||
(1.7482)* | (0.5834) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM .3/LPM1.0 | 0.0293 | 0.0133 | 0.0043 | 0.1680 | UPM1.0/LPM1.0 | −0.0419 | −0.0542 | −0.0025 | 0.1904 |
(0.5002) | (0.2269) | (0.0737) | (2.9069)*** | (−0.7149) | (−0.9259) | (−0.0433) | (3.3088)*** | ||
UPM .5/LPM2.0 | −0.0949 | −0.0543 | 0.0060 | 0.1615 | UPM2.0/LPM2.0 | −0.0282 | −0.1317 | 0.0025 | 0.1783 |
(−1.6256) | (−0.9283) | (0.1024) | (2.7918)*** | (−0.4805) | (−20.2671)** | (0.0419) | (3.0917)*** | ||
UPM .8/LPM3.0 | −0.0437 | 0.0063 | 0.0078 | 0.1343 | UPM3.0/LPM3.0 | 0.0080 | −0.0797 | −0.0194 | 0.1812 |
(−0.7467) | (0.1067) | (0.1336) | (2.3111)** | (0.1371) | (−10.3637) | (−0.3312) | (3.1422)*** | ||
UPM1.0/LPM4.0 | −0.0402 | −0.1010 | 0.0249 | 0.1342 | UPM4.0/LPM4.0 | 0.1134 | 0.0749 | −0.0318 | 0.1721 |
(−0.6857) | (−1.7314)* | (0.4243) | (2.3107)** | (1.9472)* | (1.2820) | (−0.5420) | (2.9812)*** | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | −0.0345 | −0.0575 | 0.0154 | 0.1694 | UPM2.0/LPM1.0 | 0.1219 | −0.1407 | −0.0192 | 0.1714 |
(−0.5892) | (−0.9825) | (0.2633) | (2.9327)*** | (2.0949)** | (−2.4249)** | (−0.3281) | (2.9679)*** | ||
UPM .9/LPM2.0 | 0.0758 | 0.0414 | 0.0132 | 0.1630 | UPM4.0/LPM2.0 | 0.0489 | −0.0700 | 0.0338 | 0.1659 |
(1.2962) | (0.7063) | (0.2248) | (2.8183)*** | (0.8348) | (−10.1964) | (0.5774) | (2.8690)*** | ||
UPM .9/LPM2.0 | −0.0759 | 0.1291 | 0.0263 | 0.1422 | UPM6.0/LPM3.0 | −0.0714 | −0.1033 | −0.0081 | 0.1560 |
(−1.2985) | (2.2209)** | (0.4484) | (2.4514)** | (−1.2211) | (−1.7711)* | (−0.1389) | (2.6941)*** | ||
UPM1.8/LPM4.0 | 0.0122 | −0.1569 | 0.0021 | 0.1572 | UPM8.0/LPM4.0 | −0.0088 | −0.0011 | 0.0095 | 0.1885 |
(0.2083) | (−2.7096)** | (0.0361) | (2.7148)*** | (−0.1493) | (−0.0184) | (0.1615) | (3.2747)*** |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
Begin Historic | 1 | January 1998 | |||||||
---|---|---|---|---|---|---|---|---|---|
End Historic | 109 | January 2007 | |||||||
Begin Holding | 110 | February 2007 | |||||||
End Holding | 133 | January 2009 | |||||||
T-Tests in Parenthesis | |||||||||
Statistic | Mean Hist | Mean Hold | Urho Hist | Urho Hold | Mean Hist | Mean Hold | Urho Hist | Urho Hold | |
R/V | 0.1072 | 0.0666 | |||||||
(1.8391)* | (1.1379) | ||||||||
Jensen Alpha | −0.0199 | −0.0292 | |||||||
(−0.3400) | (−0.4983) | ||||||||
R/SV | 0.1689 | 0.0269 | |||||||
(2.9232)*** | (0.4591) | ||||||||
R/B | −0.0515 | −0.0440 | |||||||
(−0.8799) | (−0.7508) | ||||||||
RISK AVERSE | RISK NEUTRAL | ||||||||
UPM .3/LPM1.0 | 0.0252 | −0.0140 | −0.0148 | 0.1989 | UPM1.0/LPM1.0 | 0.0212 | 0.0539 | −0.0181 | 0.1574 |
(0.4303) | (−0.2383) | (−0.2527) | (3.4613)*** | (0.3618) | (0.9213) | (−0.3087) | (2.7194)*** | ||
UPM .5/LPM2.0 | −0.0395 | −0.0020 | −0.0690 | 0.1606 | UPM2.0/LPM2.0 | 0.0553 | 0.0650 | −0.0326 | 0.1542 |
(−0.6752) | (−0.0333) | (−1.1805) | (2.7749)*** | (0.9440) | (1.1120) | (−0.5563) | (2.6621)*** | ||
UPM .8/LPM3.0 | 0.0337 | −0.0660 | −0.0289 | 0.1638 | UPM3.0/LPM3.0 | 0.1591 | −0.0154 | −0.0501 | 0.1814 |
(0.5752) | (−1.1288) | (−0.4939) | (2.8319)*** | (2.7486)*** | (−0.2630) | (−0.8565) | (3.1471)*** | ||
UPM1.0/LPM4.0 | 0.0285 | −0.0336 | −0.0535 | 0.1556 | UPM4.0/LPM4.0 | 0.1512 | 0.0833 | −0.0527 | 0.1805 |
(0.4866) | (−0.5729) | (−0.9138) | (2.6871)*** | (2.6087)*** | (1.4266) | (−0.9008) | (3.1314)*** | ||
PROSPECT THEORY | RISK SEEKING | ||||||||
UPM .4/LPM1.0 | −0.0117 | 0.0482 | −0.0170 | 0.1930 | UPM2.0/LPM1.0 | 0.0755 | −0.0418 | 0.0120 | 0.1890 |
(−0.1988) | (0.8236) | (−0.2905) | (3.3558)*** | (1.2919) | (−0.7139) | (0.2041) | (3.2827)*** | ||
UPM .9/LPM2.0 | 0.0436 | 0.0721 | −0.0309 | 0.1867 | UPM4.0/LPM2.0 | 0.1081 | 0.0121 | −0.0676 | 0.1549 |
(0.7441) | (1.2331) | (−0.5269) | (3.2413)*** | (1.8546)* | (0.2057) | (−1.1554) | (2.6747)*** | ||
UPM .9/LPM2.0 | −0.0140 | −0.0620 | 0.0042 | 0.1158 | UPM6.0/LPM3.0 | −0.0440 | −0.0329 | −0.0087 | 0.1626 |
(−0.2390) | (−1.0599) | (0.0715) | (1.9891)** | (−0.7520) | (−0.5612) | (−0.1488) | (2.8104)*** | ||
UPM1.8/LPM4.0 | −0.0748 | 0.0409 | −0.0164 | 0.1972 | UPM8.0/LPM4.0 | 0.1061 | −0.0160 | −0.0296 | 0.1755 |
(−1.2802) | (0.6979) | (−0.2798) | (3.4305)*** | (1.8205)* | (−0.2723) | (−0.5052) | (3.0418)*** |
Mean hist-correlation between historic performance measure and historic mean return. *10% significance; mean hold-correlation between historic performance measure and holding mean return. **5% significance; urho hist-correlation between historic UPM/LPM adjusted for rho and historic mean return. ***1% significance; urho hold-correlation between historic UPM/LPM adjusted for rho and holding mean return. ****0.1% significance.
strong predictive power throughout all UPM/LPM measures. At the same time, none of the measures were very explanatory.
In Period 2 (January 1988-January 1998,
In Period 3 (January 1998-January 2009,
As an important note to our results, the inconsistency of our predictive metric throughout all degree values is actually a major differentiation between our metric and the MPT/PMPT offerings. If we were philosophically aligned with the MPT/PMPT one-size-fits-all efficient frontier, then the inconsistency would be a concern. However, we are not; we offer a framework. It is up to the individual investor to categorize themselves with their own characteristics. Classifications of those characteristics are then presented in our results. Therefore, it should not be universal or consistent across values as each investor is not homogenous. Example, in some periods a risk seeking investor may benefit more than their risk averse counterpart. In fact, we need to divorce the notion of a global optimum efficient frontier and replace it with an individual efficient frontier that is as non-stationary as the individual utilizing the metric and may in fact look completely different than the concavity preached for decades.
Edward Thorp [
Madoff, LTCM, Bayou, Matador funds were all able to raise large sums of money under the guise that they could contain volatility while effectively disregarding the underlying Brownian forces. The continued prevalence of these metrics and indeed the financial crisis itself is a testament to the fact that this painful lesson, repeated time and again, has not been learned. Risk is not bad. In fact, it is necessary for growth. Russell Ackoff [
The investment industry does its best to warn us, have you ever heard or noticed in print, “Past performance is not indicative of future results?” With the misapplication of explanatory metrics leading to the creation of ex post efficient portfolios, it doesn’t appear many have heeded this prominent warning in their generation of ex ante portfolios. Our use of statistical certainty (ρ) as a punitive variable in quantifying risk humbles the methodology in so far as admitting we are beholden to a Knightian uncertain future12.
Viole, F. and Nawrocki, D. (2016) Predicting Risk/Return Performance Using Upper Partial Moment/ Lower Partial Moment Metrics. Journal of Mathematical Finance, 6, 900-920. http://dx.doi.org/10.4236/jmf.2016.65060
The first priority of any continuous system is survival. We actually want this bias present in our data because we are analyzing the characteristics of the survivors. Firms close for a myriad of reasons outside of actual performance statistics, so to include them quantitatively would not portray an accurate distinction of survivors and failures.
If anything, the survivorship bias in our study would pad the performance of the explanatory metrics generating higher ex post rank correlations. However, this does not offer an acceptable counterpoint to why these metrics completely fail out-of-sample regardless of the systemic event.
Furthermore, these biases have assisted in creating a far more granular explanation of the characteristics of successful investments; however, they are only explanations and not predictions. The error lies not in the bias, but in the extrapolation of the explanations.