论文信息 - Continuous dependence property of BSDE with constraints

Continuous dependence property of BSDE with constraints

In this paper, we study continuous properties of adapted solutions for backward stochastic differential equations with constraints (CBSDEs in short). Comparing with many existing literatures about this topic, our case is very general in the sense that constraints are formulated by general non-negative real functions. In general case, we proved a continuous property from below and a lower semi-continuous property of the minimal super-solution of CBSDE in its effective domain. Furthermore, in the special convex case, we obtained a continuous property with the help of convex analysis.

Yong Ren | Feng Hu | Helin Wu

[1] Ioannis Karatzas,et al. Backward stochastic differential equations with constraints on the gains-process , 1998 .

[2] S. Peng,et al. Adapted solution of a backward stochastic differential equation , 1990 .

[3] Shige Peng,et al. Reflected BSDE with a constraint and its applications in an incomplete market , 2010 .

[4] Francesco Manzo,et al. Nucleation and growth for the Ising model in $d$ dimensions at very low temperatures , 2011, 1102.1741.

[5] H. Föllmer,et al. Stochastic Finance: An Introduction in Discrete Time , 2002 .

[6] S. Peng,et al. The smallest g-supermartingale and reflected BSDE with single and double L2 obstacles , 2005 .

[7] S. Shreve,et al. Methods of Mathematical Finance , 2010 .

[8] Continuous dependence properties on solutions of backward stochastic differential equation , 2007 .

[9] Emanuela Rosazza Gianin,et al. Risk measures via g-expectations , 2006 .

[10] S. Peng,et al. Reflected solutions of backward SDE's, and related obstacle problems for PDE's , 1997 .

[11] S. Peng,et al. Backward Stochastic Differential Equations in Finance , 1997 .

[12] Samuel Drapeau,et al. Minimal Supersolutions of Convex BSDEs , 2011 .

[13] Hyunjoong Kim,et al. Functional Analysis I , 2017 .

[14] S. Peng. Monotonic limit theorem of BSDE and nonlinear decomposition theorem of Doob–Meyers type , 1999 .