Merton's portfolio optimization problem in the presence of transaction costs for multiple assets has been an important and challenging problem in both theory and practice. Most existing work suffers from curse of dimensionality and encounters with the difficulty of generalization. In this paper, we develop an approximate dynamic programing method of synergistically combining the Lowner-John ellipsoid approximation with conventional value function iteration to quantify the associated optimal trading policy. Through constructing Lowner-John ellipsoids to parameterize the optimal policy and taking Euclidean projections onto the constructed ellipsoids to implement the trading policy, the proposed algorithm has cut computational costs up to a fa...
When buying and selling assets on the markets, the investors incur in payment of commissions and oth...
Thesis (M. Eng.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Compute...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...
We consider the problem of maximizing an expected utility function of n assets, such as the mean-var...
Portfolio optimization is an important field of research within financial engineering. The aim of th...
A portfolio optimization problem consists of maximizing an expected utility function of n assets. At...
In Part 1 of this paper, we introduced a (2K+1)n-dimensional portfolio optimization problem with var...
Portfolio optimization with linear and fixed transaction costs We consider the problem of portfolio ...
We show how to use a transaction cost term in a portfolio optimization problem to compute portfolios...
We analyze the optimal portfolio policy for a multiperiod mean-variance investor facing multiple ris...
In this article we propose a new way to include transaction costs into a mean-variance portfolio opt...
A. Addendum on Gradient Penalties In this note, we discuss some of the “gradient penalties ” used in...
The thesis provides robust and efficient lattice based algorithms for solving dynamic portfolio allo...
Portfolio optimization is a long studied problem in mathematical finance which seeks to identify the...
We consider the portfolio optimization problem for a multiperiod investor who seeks to maximize her ...
When buying and selling assets on the markets, the investors incur in payment of commissions and oth...
Thesis (M. Eng.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Compute...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...
We consider the problem of maximizing an expected utility function of n assets, such as the mean-var...
Portfolio optimization is an important field of research within financial engineering. The aim of th...
A portfolio optimization problem consists of maximizing an expected utility function of n assets. At...
In Part 1 of this paper, we introduced a (2K+1)n-dimensional portfolio optimization problem with var...
Portfolio optimization with linear and fixed transaction costs We consider the problem of portfolio ...
We show how to use a transaction cost term in a portfolio optimization problem to compute portfolios...
We analyze the optimal portfolio policy for a multiperiod mean-variance investor facing multiple ris...
In this article we propose a new way to include transaction costs into a mean-variance portfolio opt...
A. Addendum on Gradient Penalties In this note, we discuss some of the “gradient penalties ” used in...
The thesis provides robust and efficient lattice based algorithms for solving dynamic portfolio allo...
Portfolio optimization is a long studied problem in mathematical finance which seeks to identify the...
We consider the portfolio optimization problem for a multiperiod investor who seeks to maximize her ...
When buying and selling assets on the markets, the investors incur in payment of commissions and oth...
Thesis (M. Eng.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Compute...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...