H. Mete Soner, Nizar Touzi, Jianfeng Zhang
Published 2010-03-31, updated 2012-02-26Version 2
We provide an existence and uniqueness theory for an extension of backward SDEs to the second order. While standard Backward SDEs are naturally connected to semilinear PDEs, our second order extension is connected to fully nonlinear PDEs, as suggested by Cheridito et.al. In particular, we provide a fully nonlinear extension of the Feynman-Kac formula. Unlike the earlier papers, the alternative formulation of this paper insists that the equation must hold under a non-dominated family of mutually singular probability measures. The key argument is a stochastic representation, suggested by the optimal control interpretation, and analyzed in our accompanying paper
Comments: 36 pages
Journal: Probability Theory and Related Fields, 153, 149--190, (2012)
The Wellposedness of Path-dependent Multidimensional Forward-backward SDE
On well-posedness of forward-backward SDEs-A unified approach
Minimal supersolutions of BSDEs under volatility uncertainty
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