This thesis is divided into two parts that may be read independently. The first part is about the mathematical modelling of liquidity risk. The aspect of illiquidity studied here is the constraint on the trading dates, meaning that in opposition to the classical models where investors may trade continuously, we assume that trading is only possible at discrete random times. We then use optimal control techniques (dynamic programming and Hamilton-Jacobi-Bellman equations) to identify the value functions and optimal investment strategies under these constraints. The first chapter focuses on a utility maximisation problem in finite horizon, in a framework inspired by energy markets. In the second chapter we study an illiquid market with regime-...
This PhD dissertation consists of three independent parts and deals with applications of stochastic ...
We study the problem of optimal portfolio selection in an illiquid market with discrete order flow. ...
We study optimal portfolio choices for an agent with the aim of maximising utility from terminal wea...
This thesis is divided into two parts that may be read independently. The first part is about the ma...
Cette thèse porte sur l'étude de quelques problèmes de contrôle stochastique dans un contexte de ris...
This thesis contains three parts that can be read independently. In the first part, we study the res...
This thesis contains three parts that can be read independently. In the first part, we study the res...
Continuous stochastic control theory has found many applications in optimal investment. However, it ...
We consider a portfolio/consumption choice problem in a market model with liquidity risk. The main f...
A trader wishes to execute a given number of shares of an illiquid asset. Since the asset price also...
In this paper, we consider the optimal consumption and investment strategies for households througho...
We study stochastic control applications to real options and to liquidity risk model. More precisely...
We study a problem of optimal investment/consumption over an infinite horizon in a market with two p...
We consider an illiquid financial market with different regimes modeled by a continuous-time finite-...
In this thesis, we address the problem of constructing effective hedging strategies against the fina...
This PhD dissertation consists of three independent parts and deals with applications of stochastic ...
We study the problem of optimal portfolio selection in an illiquid market with discrete order flow. ...
We study optimal portfolio choices for an agent with the aim of maximising utility from terminal wea...
This thesis is divided into two parts that may be read independently. The first part is about the ma...
Cette thèse porte sur l'étude de quelques problèmes de contrôle stochastique dans un contexte de ris...
This thesis contains three parts that can be read independently. In the first part, we study the res...
This thesis contains three parts that can be read independently. In the first part, we study the res...
Continuous stochastic control theory has found many applications in optimal investment. However, it ...
We consider a portfolio/consumption choice problem in a market model with liquidity risk. The main f...
A trader wishes to execute a given number of shares of an illiquid asset. Since the asset price also...
In this paper, we consider the optimal consumption and investment strategies for households througho...
We study stochastic control applications to real options and to liquidity risk model. More precisely...
We study a problem of optimal investment/consumption over an infinite horizon in a market with two p...
We consider an illiquid financial market with different regimes modeled by a continuous-time finite-...
In this thesis, we address the problem of constructing effective hedging strategies against the fina...
This PhD dissertation consists of three independent parts and deals with applications of stochastic ...
We study the problem of optimal portfolio selection in an illiquid market with discrete order flow. ...
We study optimal portfolio choices for an agent with the aim of maximising utility from terminal wea...