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Evaluation of a Portfolio in Dow Jones Industrial Average Optimized by Mean-Variance Analysis / Utvärdering av en portfölj i Dow Jones Industrial Average optimerad genom mean-variance analysisStrid, Alexander, Liu, Daniel January 2020 (has links)
This thesis evaluates the mean-variance analysis framework by comparing the performance of an optimized portfolio consisting of stocks from the Dow Jones Industrial Average to the performance of the Dow Jones Industrial Average index itself. The results show that the optimized portfolio performs better than the corresponding index when evaluated on the period between 2015 and 2019. However, the variance of the returns are high and therefore it is difficult to determine if mean-variance analysis performs better than its corresponding index in the general case. Furthermore, it is shown that individual stocks can still influence the movement of an optimized portfolio significantly, even though the model is supposed to diversify firm-specific risk. Thus, the authors recommend modifying the model by restricting the amount that is allowed to be invested in a single stock, if one wishes to apply mean-variance analysis in reality. To be able to draw further conclusions, more practical research within the subject needs to be done. / Denna uppsats utvärderar ramverket ”mean-variance analysis” genom att jämföra prestandan av en optimerad portfölj bestående av aktier från Dow Jones Industrial Average med prestandan av indexet Dow Jones Industrial Average självt. Resultaten visar att att den optimerade portföljen presterar bättre än motsvarande index när de utvärderas på perioden 2015 till 2019. Dock är variansen av avkastningen hög och det är därför svårt att bedöma om mean-variance analysis generellt sett presterar bättre än sitt motsvarande index. Vidare visas det att individuella aktier fortfarande kan påverka den optimerade portföljens rörelser, fastän modellen antas diversifiera företagsspecifik risk. På grund av detta rekommenderar författarna att modifiera modellen genom att begränsa mängden som kan investeras i en individuell aktie, om man önskar att tillämpa mean-variance analysis i verkligheten. För att kunna dra vidare slutsatser så krävs mer praktisk forskning inom området.
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Black-Litterman 模型在組合型基金的應用 / Application of the Black-Litterman Model on Fund of Funds廖哲宏, Liao,Che Hung Unknown Date (has links)
本篇論文主要是將Black-Litterman模型應用在組合型基金上。從一個組合型基金的基金經理人角度出發,在有限的風險下,如何進行資產配置使其達到報酬極大化的目標?第二章介紹mean-variance模型,以及其模型之缺點。第三章介紹Black-Litterman模型,其不僅可以改善mean-variace模型的缺點,此外允許投資人加入主觀看法,結合數量方法以及投資人的主觀看法是此模型的特色之一。第四章,針對兩個模型的進行比較。最後,我們發現:BLack-Litterman模型不僅符合經濟直覺,進行資產配置時也展現模型的穩定性。 / This paper applies a popular asset allocation model: the Black-Litterman model on a fund of funds. First, an overview is given of the foundations of modern portfolio theory with the mean-variance model. Next, we discuss some improvements that could be made over the mean-variance model. The Black-Litterman model addresses some of these flaws and tries to improve them. Finally, simulation has been performed to compare the performance of the Black-Litterman model to mean-variance optimization. The models have been compared in intuitiveness and stability. The conclusion can be drawn that BL-model improves the mean-variance model, in our simulation, both in intuitiveness and stability.
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Obchodní strategie v neúplném trhu / Obchodní strategie v neúplném trhuBunčák, Tomáš January 2011 (has links)
MASTER THESIS ABSTRACT TITLE: Trading Strategy in Incomplete Market AUTHOR: Tomáš Bunčák DEPARTMENT: Department of Probability and Mathematical Statistics, Charles University in Prague SUPERVISOR: Andrea Karlová We focus on the problem of finding optimal trading strategies (in a meaning corresponding to hedging of a contingent claim) in the realm of incomplete markets mainly. Although various ways of hedging and pricing of contingent claims are outlined, main subject of our study is the so-called mean-variance hedging (MVH). Sundry techniques used to treat this problem can be categorized into two approaches, namely a projection approach (PA) and a stochastic control approach (SCA). We review the methodologies used within PA in diversely general market models. In our research concerning SCA, we examine the possibility of using the methods of optimal stochastic control in MVH, and we study the problem of our interest in several settings of market models; involving cases of pure diffusion models and a jump- diffusion case. In order to reach an exemplary comparison, we provide solutions of the MVH problem in the setting of the Heston model via techniques of both of the approaches. Some parts of the thesis are accompanied with numerical illustrations.
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Controle ótimo multi-período de média-variância para sistemas lineares sujeitos a saltos Markovianos e ruídos multiplicativos. / Multi-period mean-variance optimal control of Markov jumps linear systems with multiplicative noise.Okimura, Rodrigo Takashi 06 April 2009 (has links)
Este estudo considera o problema de controle ótimo multi-período de média-variância para sistemas em tempo discreto com saltos markovianos e ruídos multiplicativos. Inicialmente considera-se um critério de desempenho formado por uma combinação linear da variância nal e valor esperado da saída do sistema. É apresentada uma solução analítica na obtenção da estratégia ótima para este problema. Em seguida são considerados os casos onde os critérios de desempenho são minimizar a variância nal sujeito a uma restrição no valor esperado ou maximizar o valor esperado nal sujeito a uma restrição na variância nal da saída do sistema. As estratégias ótimas de controle são obtidas de um conjunto de equações de diferenças acopladas de Riccati. Os resultados obtidos neste estudo generalizam resultados anteriores da literatura para o problema de controle ótimo com saldos markovianos e ruídos multiplicativos, apresentando condições explícitas e sucientes para a otimalidade da estratégia de controle. São apresentados modelos e simulações numéricas em otimização de carteiras de investimento e estratégias de gestão de ALM (asset liabilities management). / This thesis focuses on the stochastic optimal control problem of discrete-time linear systems subject to Markov jumps and multiplicative noise under three kinds of performance criterions related to the nal value of the expectation and variance of the output. In the first problem it is desired to minimize the nal variance of the output subject to a restriction on its nal expectation, in the second one it is desired to maximize the nal expectation of the output subject to a restriction on its nal variance, and in the third one it is considered a performance criterion composed by a linear combination of the nal variance and expectation of the output of the system. The optimal control strategies are obtained from a set of interconnected Riccati dierence equations and explicit sufficient conditions are presented for the existence of an optimal control strategy for these problems, generalizing previous results in the literature. Numerical simulations of investment portfolios and asset liabilities management models for pension funds with regime switching are presented.
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Risk Minimization in Power System Expansion and Power Pool Electricity MarketsAlvarez Lopez, Juan January 2007 (has links)
Centralized power system planning covers time windows that range
from ten to thirty years. Consequently, it is the longest and most
uncertain part of power system economics. One of the challenges that
power system planning faces is the inability to accurately predict
random events; these random events introduce risk in the planning
process. Another challenge stems from the fact that, despite having
a centralized planning scheme, generation plans are set first and
then transmission expansion plans are carried out. This thesis
addresses these problems. A joint model for generation and
transmission expansion for the vertically integrated industry is
proposed. Randomness is considered in demand, equivalent
availability factors of the generators, and transmission capacity
factors of the transmission lines. The system expansion model is
formulated as a two-stage stochastic program with fixed recourse and
probabilistic constraints. The transmission network is included via
a DC approximation. The mean variance Markowitz theory is used as a
risk minimization technique in order to minimize the variance of the
annualized estimated generating cost. This system expansion model is
capable of considering the locations of new generation and
transmission and also of choosing the right mixture of generating
technologies.
The global tendency is to move from regulated power systems to
deregulated power systems. Power pool electricity markets, assuming
that the independent system operator is concerned with the social
cost minimization, face great uncertainties from supply and demand
bids submitted by market participants. In power pool electricity
markets, randomness in the cost and benefit functions through random
demand and supply functions has never been considered before. This
thesis considers as random all the coefficients of the quadratic
cost and benefit functions and uses the mean variance Markowitz
theory to minimize the social cost variance. The impacts that this
risk minimization technique has on nodal prices and on the
elasticities of the supply and demand curves are studied.
All the mathematical models in this thesis are exemplified by the
six-node network proposed by Garver in 1970, by the 21-node network
proposed by the IEEE Reliability Test System Task Force in 1979, and
by the IEEE 57- and 118-node systems.
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Risk Minimization in Power System Expansion and Power Pool Electricity MarketsAlvarez Lopez, Juan January 2007 (has links)
Centralized power system planning covers time windows that range
from ten to thirty years. Consequently, it is the longest and most
uncertain part of power system economics. One of the challenges that
power system planning faces is the inability to accurately predict
random events; these random events introduce risk in the planning
process. Another challenge stems from the fact that, despite having
a centralized planning scheme, generation plans are set first and
then transmission expansion plans are carried out. This thesis
addresses these problems. A joint model for generation and
transmission expansion for the vertically integrated industry is
proposed. Randomness is considered in demand, equivalent
availability factors of the generators, and transmission capacity
factors of the transmission lines. The system expansion model is
formulated as a two-stage stochastic program with fixed recourse and
probabilistic constraints. The transmission network is included via
a DC approximation. The mean variance Markowitz theory is used as a
risk minimization technique in order to minimize the variance of the
annualized estimated generating cost. This system expansion model is
capable of considering the locations of new generation and
transmission and also of choosing the right mixture of generating
technologies.
The global tendency is to move from regulated power systems to
deregulated power systems. Power pool electricity markets, assuming
that the independent system operator is concerned with the social
cost minimization, face great uncertainties from supply and demand
bids submitted by market participants. In power pool electricity
markets, randomness in the cost and benefit functions through random
demand and supply functions has never been considered before. This
thesis considers as random all the coefficients of the quadratic
cost and benefit functions and uses the mean variance Markowitz
theory to minimize the social cost variance. The impacts that this
risk minimization technique has on nodal prices and on the
elasticities of the supply and demand curves are studied.
All the mathematical models in this thesis are exemplified by the
six-node network proposed by Garver in 1970, by the 21-node network
proposed by the IEEE Reliability Test System Task Force in 1979, and
by the IEEE 57- and 118-node systems.
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Continuous Time Mean Variance Optimal PortfoliosSezgin Alp, Ozge 01 September 2011 (has links) (PDF)
The most popular and fundamental portfolio optimization problem is
Markowitz' / s one period mean-variance portfolio selection problem.
However, it is criticized because of its one period static nature.
Further, the estimation of the stock price expected return is a
particularly hard problem. For this purpose, there are a lot of
studies solving the mean-variance portfolio optimization problem
in continuous time. To solve the estimation problem of the stock
price expected return, in 1992, Black and Litterman proposed the
Bayesian asset allocation method in discrete time. Later on,
Lindberg has introduced a new way of parameterizing the price
dynamics in the standard Black-Scholes and solved the continuous
time mean-variance portfolio optimization problem.
In this thesis, firstly we take up the Lindberg' / s approach, we
generalize the results to a jump-diffusion market setting and we
correct the proof of the main result. Further, we demonstrate the
implications of the Lindberg parameterization for the stock price
drift vector in different market settings, we analyze the
dependence of the optimal portfolio from jump and diffusion risk,
and we indicate how to use the method.
Secondly, we present the Lagrangian function approach of Korn and
Trautmann and we derive some new results for this approach, in
particular explicit representations for the optimal portfolio
process. In addition, we present the L2-projection approach
of Schweizer for the continuous time mean-variance portfolio
optimization problem and derive the optimal portfolio and the
optimal wealth processes for this approach. While, deriving these
results as the underlying model, the market parameterization of
Lindberg is chosen.
Lastly, we compare these three different optimization frameworks
in detail and their attractive and not so attractive features are
highlighted by numerical examples.
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Momentum Investment Strategies with Portfolio Optimization : A Study on Nasdaq OMX Stockholm Large CapJonsson, Robin, Radeschnig, Jessica January 2014 (has links)
This report covers a study testing the possibility of adding portfolio optimization by mean-variance analysis as a tool to extend the concept of momentum strategies in contrast to naive allocation formed by Jegadeesh & Titman (1993). Further these active investment strategies are compared with a passive benchmark as well as a randomly selected portfolio over the entire study-period. The study showed that the naive allocation model outperformed the mean-variance model both economically as well as statistically. No indication where obtained for a lagged return effect when letting a mean-variance model choose weights for a quarterly holding period and the resulting investment recommendation is to follow a naive investment strategy within a momentum framework.
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The Black-Litterman Asset Allocation Model : An Empirical Comparison to the Classical Mean-Variance FrameworkHirani, Shyam, Wallström, Jonas January 2014 (has links)
Within the scope of this thesis, the Black-Litterman Asset Allocation Model (as presented in He & Litterman, 1999) is compared to the classical mean-variance framework by simulating past performance of portfolios constructed by both models using identical input data. A quantitative investment strategy which favours stocks with high dividend yield rates is used to generate private views about the expected excess returns for a fraction of the stocks included in the sample. By comparing the ex-post risk-return characteristics of the portfolios and performing ample sensitivity analysis with respect to the numerical values assigned to the input variables, we evaluate the two models’ suitability for different categories of portfolio managers. As a neutral benchmark towards which both portfolios can be measured, a third market-capitalization-weighted portfolio is constructed from the same investment universe. The empirical data used for the purpose of our simulations consists of total return indices for 23 of the 30 stocks included in the OMXS30 index as of the 21st of February 2014 and stretches between January of 2003 and December of 2013. The results of our simulations show that the Black-Litterman portfolio has delivered risk-adjusted return which is superior not only to that of its market-capitalization-weighted counterpart but also to that of the classical mean-variance portfolio. This result holds true for four out of five simulated strengths of the investment strategy under the assumption of zero transaction costs, a rebalancing frequency of 20 trading days, an estimated risk aversion parameter of 2.5 and a five per cent uncertainty associated with the CAPM prior. Sensitivity analysis performed by examining how the results are affected by variations in these input variables has also shown notable differences in the sensitivity of the results obtained from the two models. While the performance of the Black-Litterman portfolio does undergo material changes as the inputs are varied, these changes are nowhere near as profound as those exhibited by the classical mean-variance portfolio. In the light of our empirical results, we also conclude that there are mainly two aspects which the portfolio manager ought to consider before committing to one model rather than the other. Firstly, the nature behind the views generated by the investment strategy needs to be taken into account. For the implementation of views which are of an α-driven character, the dynamics of the Black-Litterman model may not be as appropriate as for views which are believed to also influence the expected return on other securities. Secondly, the soundness of using market-capitalization weights as a benchmark towards which the final solution will gravitate needs to be assessed. Managers who strive to achieve performance which is fundamentally uncorrelated to that of the market index may want to either reconsider the benchmark weights or opt for an alternative model.
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A Hybrid of Stochastic Programming Approaches with Economic and Operational Risk Management for Petroleum Refinery Planning under UncertaintyKhor, Cheng Seong January 2006 (has links)
In view of the current situation of fluctuating high crude oil prices, it is now more important than ever for petroleum refineries to operate at an optimal level in the present dynamic global economy. Acknowledging the shortcomings of deterministic models, this work proposes a hybrid of stochastic programming formulations for an optimal midterm refinery planning that addresses three factors of uncertainties, namely price of crude oil and saleable products, product demand, and production yields. An explicit stochastic programming technique is utilized by employing compensating slack variables to account for violations of constraints in order to increase model tractability. Four approaches are considered to ensure both solution and model robustness: (1) the Markowitz???s mean???variance (MV) model to handle randomness in the objective coefficients of prices by minimizing variance of the expected value of the random coefficients; (2) the two-stage stochastic programming with fixed recourse approach via scenario analysis to model randomness in the right-hand side and left-hand side coefficients by minimizing the expected recourse penalty costs due to constraints??? violations; (3) incorporation of the MV model within the framework developed in Approach 2 to minimize both the expectation and variance of the recourse costs; and (4) reformulation of the model in Approach 3 by adopting mean-absolute deviation (MAD) as the risk metric imposed by the recourse costs for a novel application to the petroleum refining industry. A representative numerical example is illustrated with the resulting outcome of higher net profits and increased robustness in solutions proposed by the stochastic models.
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