We investigate numerical aspects of a portfolio selection problem studied in [10], in which we suggest a model of liquidity risk and price impact and formulate the problem as an impulse control problem under state constraint. We show that our impulse control problem could be reduced to an iterative sequence of optimal stopping problems. Given the dimension of our problem and the complexity of its solvency region, we use Monte Carlo methods instead of finite difference methods to calculate the value function, the transaction and no-transaction regions. We provide a numerical approximation algorithm as well as numerical results for the optimal transaction strategy
We propose a general framework for intra-day trading based on the control of trading algorithms. Gi...
Cette thèse porte sur l'étude de quelques problèmes de contrôle stochastique dans un contexte de ris...
We propose a general framework for intra-day trading based on the control of trading algorithms. Giv...
18 pagesWe investigate numerical aspects of a portfolio selection problem studied in [10], in which ...
We study a financial model with one risk-free and one risky asset subject to liquidity risk and pric...
We study a financial model with one risk-free and one risky asset subject to liquidity risk and pric...
We study a single risky financial asset model subject to price impact and transaction cost over an f...
We consider three applications of impulse control in financial mathematics, a cash management proble...
The main purpose of this thesis is to study a singular finite-horizon portfolio optimization problem...
This paper deals with numerical solutions to an impulse control problem arising from optimal portfol...
Stochastic control refers to the optimal control of systems subject to randomness. Impulse and singu...
This paper deals with numerical solutions to an impulse control problem arising from optimal portfol...
We study the optimal loan securitization policy of a commercial bank which is mainly engaged in lend...
We present efficient partial differential equation methods for continuous time mean-variance portfol...
The value of a position in a risky asset when optimally sold in an illiquid market is considered. Th...
We propose a general framework for intra-day trading based on the control of trading algorithms. Gi...
Cette thèse porte sur l'étude de quelques problèmes de contrôle stochastique dans un contexte de ris...
We propose a general framework for intra-day trading based on the control of trading algorithms. Giv...
18 pagesWe investigate numerical aspects of a portfolio selection problem studied in [10], in which ...
We study a financial model with one risk-free and one risky asset subject to liquidity risk and pric...
We study a financial model with one risk-free and one risky asset subject to liquidity risk and pric...
We study a single risky financial asset model subject to price impact and transaction cost over an f...
We consider three applications of impulse control in financial mathematics, a cash management proble...
The main purpose of this thesis is to study a singular finite-horizon portfolio optimization problem...
This paper deals with numerical solutions to an impulse control problem arising from optimal portfol...
Stochastic control refers to the optimal control of systems subject to randomness. Impulse and singu...
This paper deals with numerical solutions to an impulse control problem arising from optimal portfol...
We study the optimal loan securitization policy of a commercial bank which is mainly engaged in lend...
We present efficient partial differential equation methods for continuous time mean-variance portfol...
The value of a position in a risky asset when optimally sold in an illiquid market is considered. Th...
We propose a general framework for intra-day trading based on the control of trading algorithms. Gi...
Cette thèse porte sur l'étude de quelques problèmes de contrôle stochastique dans un contexte de ris...
We propose a general framework for intra-day trading based on the control of trading algorithms. Giv...