This paper deals with asset allocation problems formulated as multistage stochastic programming models. Dynamic models allow rebalancing the portfolio multiple times before the final investment horizon is reached.
The CVaR risk measure is used for its favorable properties, and time consistent model is developed. The stock prices are assumed to be interstage independent and to follow lognormal distribution.
The stochastic dual dynamic programming algorithm is then applied to solve the presented models. An extensive numerical study based on the data from Prague Stock Exchange compares the results obtained from static two stage models with the results from dynamic models having multiple stages.
Both cases, with or without the transaction costs, are considered.