| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 476731 | European Journal of Operational Research | 2013 | 9 Pages |
This paper studies constrained portfolio problems that may involve constraints on the probability or the expected size of a shortfall of wealth or consumption. Our first contribution is that we solve the problems by dynamic programming, which is in contrast to the existing literature that applies the martingale method. More precisely, we construct the non-separable value function by formalizing the optimal constrained terminal wealth to be a (conjectured) contingent claim on the optimal non-constrained terminal wealth. This is relevant by itself, but also opens up the opportunity to derive new solutions to constrained problems. As a second contribution, we thus derive new results for non-strict constraints on the shortfall of intermediate wealth and/or consumption.
► We explain how dynamic programming can be used for constrained portfolio problems. ► We solve portfolio problems with probabilistic constraints by dynamic programming. ► We solve consumption–investment problems with probabilistic constraints on consumption.
