Investment and risk control are becoming increasingly important for financial institutions. Asset allocation provides a fundamental investing principle to manage the risk and return trade-off in financial markets. This article proposes a general formulation of a first approximation of multiperiod asset allocation modeling for institutions that invest to meet the target payment structures of a long-term liability. By addressing the shortcomings of both single-period models and the single-point forecast of the mean variance approach, this article derives explicit formulae for optimal asset allocations, taking into account possible future realizations in a multiperiod discrete time model. Copyright (c) The Journal of Risk and Insurance, 2010.
We present some rudimentary concepts on asset/liability management and describe an approach to asset...
We present a geometric approach to discrete time multiperiod mean variance portfolio opti-mization t...
Asset allocation decisions are critical for investors with diversiåed portfolios. Institutional in-v...
This paper considers the optimal asset allocation problems under valueat- risk (VaR) constraints by ...
We develop an analytical solution to the dynamic multi-period portfolio choice problem of an investo...
© 2016 John Wiley & Sons, Ltd. We develop an analytical solution to the dynamic multi-period portf...
This paper studies optimal asset allocation for investors over multiple investment horizons. Rather ...
In this paper, we consider the optimal asset allocation problems under VaR constraints. It is shown ...
This paper uses an asset-liability management model to solve multi-period investment problems. The m...
This paper develops a continuous time modeling approach for making optimal asset allocation decision...
A discrete time probabilistic model, for optimal equity allocation and portfolio selection, is formu...
We present a geometric approach to discrete time multiperiod mean variance portfolio optimization th...
This paper investigates the optimal asset allocation of a financial institution whose customers are ...
We analyze the optimal portfolio policy for a multiperiod mean-variance investor facing multiple ris...
This paper investigates the optimal asset allocation of a financial institution whose customers are ...
We present some rudimentary concepts on asset/liability management and describe an approach to asset...
We present a geometric approach to discrete time multiperiod mean variance portfolio opti-mization t...
Asset allocation decisions are critical for investors with diversiåed portfolios. Institutional in-v...
This paper considers the optimal asset allocation problems under valueat- risk (VaR) constraints by ...
We develop an analytical solution to the dynamic multi-period portfolio choice problem of an investo...
© 2016 John Wiley & Sons, Ltd. We develop an analytical solution to the dynamic multi-period portf...
This paper studies optimal asset allocation for investors over multiple investment horizons. Rather ...
In this paper, we consider the optimal asset allocation problems under VaR constraints. It is shown ...
This paper uses an asset-liability management model to solve multi-period investment problems. The m...
This paper develops a continuous time modeling approach for making optimal asset allocation decision...
A discrete time probabilistic model, for optimal equity allocation and portfolio selection, is formu...
We present a geometric approach to discrete time multiperiod mean variance portfolio optimization th...
This paper investigates the optimal asset allocation of a financial institution whose customers are ...
We analyze the optimal portfolio policy for a multiperiod mean-variance investor facing multiple ris...
This paper investigates the optimal asset allocation of a financial institution whose customers are ...
We present some rudimentary concepts on asset/liability management and describe an approach to asset...
We present a geometric approach to discrete time multiperiod mean variance portfolio opti-mization t...
Asset allocation decisions are critical for investors with diversiåed portfolios. Institutional in-v...