Abstract
The mean-variance (MV) portfolio optimization targets higher return for investment period despite the unknown stochastic behavior of the future asset returns. That is why a risk is explicitly considering, quantified by algebraic characteristics of volatilities and co-variances. A new probabilistic definition of portfolio risk is the Value at Risk (VaR). The paper makes explicit inclusion and minimization of VaR as a quantitative measure of financial sustainability of a portfolio problem. Thus, the portfolio weights as problem solutions will respect not only the MV requirements for risk and return, but also the additional minimization of risk defined by VaR level. The portfolio problem is defined in a new, bi-level form. The upper level minimizes and evaluates the VaR value. The lower level evaluates the optimal assets weights by minimizing portfolio risk and maximizing the return in MV form. The bi-level model allows to have extended set of portfolio solutions with the portfolio weights and the value of VaR. Graphical interpretation of this bi-level definition of the portfolio problem explains the differences with the MV portfolio definition. Thus, the bi-level portfolio problem evaluates the optimal weights, which makes maximization of portfolio return and minimization of the risk in its algebraic and probabilistic form of definition.
Highlights
The financial sustainability is always important qualitative criterion for investors and business managers
Value at Risk (VaR) can be used for different distribution laws, which is an advantage for form of portfolio risk
For VaR and/or CVaR relations to be included in a portfolio problem, the general approach is to approximate the probabilistic relations with algebraic ones
Summary
The financial sustainability is always important qualitative criterion for investors and business managers. For the case of the portfolio risk, this means that the bi-level approach will find optimal value of the portfolio risk as variance of the asset returns but simultaneously as optimal value of the probabilistic form of the risk, given by the parameter VaR. Such integration and optimal evaluation of both important characteristics of portfolio risk is a prerequisite for considering stable sustainability in the portfolio optimization. Its value is optimal and this case differs when VaR participates as predefined value as a constraint in the portfolio problem
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