Mingshang Hu, Shaolin Ji, Shige Peng, Yongsheng Song
Published 2012-06-26Version 1
In this paper, we study backward stochastic differential equations driven by a G-Brownian motion. The solution of such new type of BSDE is a triple (Y,Z,K) where K is a decreasing G-martingale. Under a Lipschitz condition for generator f and g in Y and Z. The existence and uniqueness of the solution (Y,Z,K) is proved. Although the methods used in the proof and the related estimates are quite different from the classical proof for BSDEs, stochastic calculus in G-framework plays a central role.
Stochastic Optimization Theory of Backward Stochastic Differential Equations Driven by G-Brownian Motion
Existence, uniqueness and strict comparison theorems for backward stochastic differential equations driven by RCLL martingales
On the Representation Theorem of G-Expectations and Paths of G--Brownian Motion
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