In this paper, we study the dynamic risk measures for processes induced by backward stochastic differential equations driven by Teugel’s martingales associated with Lévy processes (BSDELs). The representation theorem for generators of BSDELs is provided. Furthermore, the time consistency of the coherent and convex dynamic risk measures for processes is characterized by means of the generators of BSDELs. Moreover, the coherency and convexity of dynamic risk measures for processes are characterized by the generators of BSDELs. Finally, we provide two numerical examples to illustrate the proposed dynamic risk measures
We study dynamic monetary risk measures that depend on bounded discrete-time processes describing th...
This thesis studies problems in risk-averse decision making with uncertain outcomes. In particular, ...
International audienceIn the Brownian case, the links between dynamic risk measures and BSDEs have b...
In this short paper we provide a new representation result for dynamic capital al-locations and dyna...
Continuous-time dynamic convex and coherent risk measures are introduced. To obtain existence of suc...
Continuous-time dynamic convex and coherent risk measures are introduced. To obtain existence of suc...
We consider dynamic risk measures induced by backward stochastic differential equations (BSDEs) in a...
Most previous contributions to BSDEs, and the related theories of nonlinear expectation and dynamic ...
We derive a representation for dynamic capital allocation when the underlying asset price process in...
Abstract Using backward stochastic difference equations (BSDEs), this paper studies dynamic convex r...
Inspired by the consideration of some inside and future market information in financial market, a cl...
This thesis studies financial risk measures which dynamically assign a value to a risk at a future d...
Considerably much work has been done on Backward Stochastic Differential Equations (BSDEs) in contin...
A backward stochastic differential equation (BSDE) approach is used to evaluate convex risk measures...
Markovian forward-backward stochastic differential equations, (MFBSDEs), are discussed by exploiting...
We study dynamic monetary risk measures that depend on bounded discrete-time processes describing th...
This thesis studies problems in risk-averse decision making with uncertain outcomes. In particular, ...
International audienceIn the Brownian case, the links between dynamic risk measures and BSDEs have b...
In this short paper we provide a new representation result for dynamic capital al-locations and dyna...
Continuous-time dynamic convex and coherent risk measures are introduced. To obtain existence of suc...
Continuous-time dynamic convex and coherent risk measures are introduced. To obtain existence of suc...
We consider dynamic risk measures induced by backward stochastic differential equations (BSDEs) in a...
Most previous contributions to BSDEs, and the related theories of nonlinear expectation and dynamic ...
We derive a representation for dynamic capital allocation when the underlying asset price process in...
Abstract Using backward stochastic difference equations (BSDEs), this paper studies dynamic convex r...
Inspired by the consideration of some inside and future market information in financial market, a cl...
This thesis studies financial risk measures which dynamically assign a value to a risk at a future d...
Considerably much work has been done on Backward Stochastic Differential Equations (BSDEs) in contin...
A backward stochastic differential equation (BSDE) approach is used to evaluate convex risk measures...
Markovian forward-backward stochastic differential equations, (MFBSDEs), are discussed by exploiting...
We study dynamic monetary risk measures that depend on bounded discrete-time processes describing th...
This thesis studies problems in risk-averse decision making with uncertain outcomes. In particular, ...
International audienceIn the Brownian case, the links between dynamic risk measures and BSDEs have b...