This article describes a class of jump-uncertain stochastic control systems, and derives an Itô–Liu formula with jump. We characterize an optimal control law, that satisfies the Hamilton–Jacobi–Bellman equation with jump. Then, this paper deduces the optimal portfolio game under uncertain stochastic financial markets with jump. The information of players is symmetrical. The financial market is constituted of a risk-free asset and a risky asset whose price process is subjected to the jump-uncertain stochastic Black–Scholes model. The game is formulated by two utility maximization problems, each investor tries to maximize his relative utility, which is the weighted average of terminal wealth difference between his terminal wealth and that of ...
The thesis examines a generalised problem of optimal control of a firm through reinsurance, dividen...
In this paper we consider the problem to find a market portfolio that minimizes the convex risk meas...
This thesis treats a range of stochastic methods with various applications, most notably in finance....
We study optimal stochastic control problems with jumps under model uncertainty. We rewrite such pro...
We discuss an optimal portfolio selection problem of an insurer who faces model uncertainty in a jum...
We study optimal stochastic control problems with jumps under model uncertainty. We rewrite such pro...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
We consider a financial market with one bond and one stock. The dynamics of the stock price process ...
We consider some robust optimal portfolio problems for markets modeled by (possibly non-Markovian) j...
This thesis addresses the topic of decision making under uncertainty, with particular focus on finan...
In this work, we study the problem of mean-variance hedging with a random horizon T ^ tau , where T ...
We investigate an optimal investment problem of an insurance company in the presence of risk constra...
The topic of this thesis is portfolio optimization under model ambiguity, i.e. a situation when the ...
We consider a risk-based asset allocation problem in a Markov, regime-switching, pure jump model. Wi...
The aims of this paper are to establish necessary and sufficient stochastic maximum principles for o...
The thesis examines a generalised problem of optimal control of a firm through reinsurance, dividen...
In this paper we consider the problem to find a market portfolio that minimizes the convex risk meas...
This thesis treats a range of stochastic methods with various applications, most notably in finance....
We study optimal stochastic control problems with jumps under model uncertainty. We rewrite such pro...
We discuss an optimal portfolio selection problem of an insurer who faces model uncertainty in a jum...
We study optimal stochastic control problems with jumps under model uncertainty. We rewrite such pro...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
We consider a financial market with one bond and one stock. The dynamics of the stock price process ...
We consider some robust optimal portfolio problems for markets modeled by (possibly non-Markovian) j...
This thesis addresses the topic of decision making under uncertainty, with particular focus on finan...
In this work, we study the problem of mean-variance hedging with a random horizon T ^ tau , where T ...
We investigate an optimal investment problem of an insurance company in the presence of risk constra...
The topic of this thesis is portfolio optimization under model ambiguity, i.e. a situation when the ...
We consider a risk-based asset allocation problem in a Markov, regime-switching, pure jump model. Wi...
The aims of this paper are to establish necessary and sufficient stochastic maximum principles for o...
The thesis examines a generalised problem of optimal control of a firm through reinsurance, dividen...
In this paper we consider the problem to find a market portfolio that minimizes the convex risk meas...
This thesis treats a range of stochastic methods with various applications, most notably in finance....