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Portfolio Selection and the Analysis of Risk and Time Diversification

Persson, Mattias LU (2001) In Lund Economic Studies 96.
Abstract
This thesis is devoted to the analysis of three important issues in financial economics in general and portfolio selection in particular: the risk measure, estimation risk and time diversification. Besides a short introductory chapter the thesis consists of four empirical essays. In the second chapter, the effect of estimation risk on the efficient frontier in the lower partial moment framework is analyzed. A simulation approach is employed for the analysis of estimation risk in the MLPM-model because it can directly show the effect and magnitude of the estimation error on the portfolios. The results of the average difference between the actual and estimated portfolios show that the estimated portfolios are biased predictors of the actual... (More)
This thesis is devoted to the analysis of three important issues in financial economics in general and portfolio selection in particular: the risk measure, estimation risk and time diversification. Besides a short introductory chapter the thesis consists of four empirical essays. In the second chapter, the effect of estimation risk on the efficient frontier in the lower partial moment framework is analyzed. A simulation approach is employed for the analysis of estimation risk in the MLPM-model because it can directly show the effect and magnitude of the estimation error on the portfolios. The results of the average difference between the actual and estimated portfolios show that the estimated portfolios are biased predictors of the actual portfolios in that they underestimate the risk in the portfolios and overestimate the portfolio mean returns. However, the estimates of the optimal portfolios can be improved. If our concern is the uncertainty in the optimal portfolio weights, then a bootstrap approach should be used to improve the optimizations since this approach produces the lowest root-mean squared errors in the study. In the third chapter, a downside risk approximation for calculating optimal portfolios in the discrete-time dynamic investment model is compared to the exact power function formulation that springs from the dynamic reinvestment model. The results show that the downside risk model approximates the dynamic model surprisingly well under both quarterly and annual revisions. However, the approximation seems to be correlated with the target rate of return in the downside risk formulation. In addition, the results suggest that the approximation perform best when the target rate of return is set high as compared to the mean returns of the basic assets. The fourth chapter analyzes whether or not mean-variance efficient portfolio weights for stocks and bills vary significantly with the investment horizon in a buy-and-hold strategy. Real returns from the U.S. asset market on a monthly basis from 1900 to 1997 were used in the analysis. As far as the question of estimation risk is concerned, the results showed that the estimation errors increased with the risk tolerance and with the investment horizon. However, the results in this study indicate that the optimal weights in stocks are not independent of the investment horizon, and that whether or not investors should tilt their portfolio weight towards or away from stocks in long horizon portfolios depends on the investor's risk aversion. The fifth chapter contains an analysis of whether the portfolio weights for stocks and bills, which are formed on the basis of direct expected utility maximization for a set of utility functions, vary significantly with the investment horizon. A non-parametric bootstrap approach is employed, which allows us to draw conclusions on whether or not differences between optimal portfolios are significant. Our analysis shows that the weights for stocks are significantly higher for long horizon investment as compared to the one-year horizon. We conclude that time diversification exists, and that the allocation decision seems to be independent of the utility function. (Less)
Abstract (Swedish)
Popular Abstract in Swedish

Denna avhandling behandlar tre centrala områden i finansiell ekonomi i allmänhet och portföljvalsteori i synnerhet: riskmåttet, estimeringsrisk och tidsdiversifiering. Avhandlingen består av fem kapitel varav ett är ett kort introduktionskapitel. De första två kapitlen behandlar ett alternativt mått på risk, lower partial moment (LPM). Detta alternativa mått behandlar endast icke önskvärda utfall som riskfyllda vilket står ni kontrast till det traditionella riskmåttet, varians, i vilket alla utfall anses riskfyllda. Resultaten indikerar att LPM är praktiskt tillämpbart trots att det är svårare att estimera bland annat pga. hög estimeringsrisk. Dessutom tyder de empiriska resultaten på att LPM... (More)
Popular Abstract in Swedish

Denna avhandling behandlar tre centrala områden i finansiell ekonomi i allmänhet och portföljvalsteori i synnerhet: riskmåttet, estimeringsrisk och tidsdiversifiering. Avhandlingen består av fem kapitel varav ett är ett kort introduktionskapitel. De första två kapitlen behandlar ett alternativt mått på risk, lower partial moment (LPM). Detta alternativa mått behandlar endast icke önskvärda utfall som riskfyllda vilket står ni kontrast till det traditionella riskmåttet, varians, i vilket alla utfall anses riskfyllda. Resultaten indikerar att LPM är praktiskt tillämpbart trots att det är svårare att estimera bland annat pga. hög estimeringsrisk. Dessutom tyder de empiriska resultaten på att LPM fungerar bättre än varians som riskmått i vissa fall. De sista två kapitlena behandlar tidsdiversifiering dvs. huruvida investerare som har en lång placeringshorisont ska investera relativt mer i aktier än någon med en kort placeringshorisont. Resultaten visar att det populära rådet är riktigt – investerare med lång placeringshorisont ska investera mer i aktier. (Less)
Please use this url to cite or link to this publication:
author
supervisor
opponent
  • Werner, Ingrid, Associate Professor of Finance, Ohio State University
organization
publishing date
type
Thesis
publication status
published
subject
keywords
economic policy, economic systems, economic theory, econometrics, Economics, Lower Partial Moment, Portfolio Selection, Parameter Uncertainty, Time Diversification, Bootstrap, Downside Risk, Estimation Risk, Nationalekonomi, ekonometri, ekonomisk teori, ekonomiska system, ekonomisk politik, Financial science, Finansiering
in
Lund Economic Studies
volume
96
pages
112 pages
publisher
Department of Economics, Lund University
defense location
EC3:210 Holger Crafoords Ekonomicentrum
defense date
2001-06-05 10:15:00
ISSN
0460-0029
ISBN
91-7874-136-X
language
English
LU publication?
yes
id
97816b7c-46b4-49a1-bf8f-898878dab891 (old id 41691)
date added to LUP
2016-04-01 16:39:59
date last changed
2019-05-21 16:27:38
@phdthesis{97816b7c-46b4-49a1-bf8f-898878dab891,
  abstract     = {{This thesis is devoted to the analysis of three important issues in financial economics in general and portfolio selection in particular: the risk measure, estimation risk and time diversification. Besides a short introductory chapter the thesis consists of four empirical essays. In the second chapter, the effect of estimation risk on the efficient frontier in the lower partial moment framework is analyzed. A simulation approach is employed for the analysis of estimation risk in the MLPM-model because it can directly show the effect and magnitude of the estimation error on the portfolios. The results of the average difference between the actual and estimated portfolios show that the estimated portfolios are biased predictors of the actual portfolios in that they underestimate the risk in the portfolios and overestimate the portfolio mean returns. However, the estimates of the optimal portfolios can be improved. If our concern is the uncertainty in the optimal portfolio weights, then a bootstrap approach should be used to improve the optimizations since this approach produces the lowest root-mean squared errors in the study. In the third chapter, a downside risk approximation for calculating optimal portfolios in the discrete-time dynamic investment model is compared to the exact power function formulation that springs from the dynamic reinvestment model. The results show that the downside risk model approximates the dynamic model surprisingly well under both quarterly and annual revisions. However, the approximation seems to be correlated with the target rate of return in the downside risk formulation. In addition, the results suggest that the approximation perform best when the target rate of return is set high as compared to the mean returns of the basic assets. The fourth chapter analyzes whether or not mean-variance efficient portfolio weights for stocks and bills vary significantly with the investment horizon in a buy-and-hold strategy. Real returns from the U.S. asset market on a monthly basis from 1900 to 1997 were used in the analysis. As far as the question of estimation risk is concerned, the results showed that the estimation errors increased with the risk tolerance and with the investment horizon. However, the results in this study indicate that the optimal weights in stocks are not independent of the investment horizon, and that whether or not investors should tilt their portfolio weight towards or away from stocks in long horizon portfolios depends on the investor's risk aversion. The fifth chapter contains an analysis of whether the portfolio weights for stocks and bills, which are formed on the basis of direct expected utility maximization for a set of utility functions, vary significantly with the investment horizon. A non-parametric bootstrap approach is employed, which allows us to draw conclusions on whether or not differences between optimal portfolios are significant. Our analysis shows that the weights for stocks are significantly higher for long horizon investment as compared to the one-year horizon. We conclude that time diversification exists, and that the allocation decision seems to be independent of the utility function.}},
  author       = {{Persson, Mattias}},
  isbn         = {{91-7874-136-X}},
  issn         = {{0460-0029}},
  keywords     = {{economic policy; economic systems; economic theory; econometrics; Economics; Lower Partial Moment; Portfolio Selection; Parameter Uncertainty; Time Diversification; Bootstrap; Downside Risk; Estimation Risk; Nationalekonomi; ekonometri; ekonomisk teori; ekonomiska system; ekonomisk politik; Financial science; Finansiering}},
  language     = {{eng}},
  publisher    = {{Department of Economics, Lund University}},
  school       = {{Lund University}},
  series       = {{Lund Economic Studies}},
  title        = {{Portfolio Selection and the Analysis of Risk and Time Diversification}},
  volume       = {{96}},
  year         = {{2001}},
}