On the uniqueness of solutions to quadratic BSDEs with convex generators and unbounded terminal conditions: the critical case
arXiv:1303.4859
Abstract
In [3], the authors proved that uniqueness holds among solutions whose exponentials are $L^p$ with $p$ bigger than a constant $γ$ ($p\textgreater{}γ$). In this paper, we consider the critical case: $p=γ$. We prove that the uniqueness holds among solutions whose exponentials are $L^γ$ under the additional assumption that the generator is strongly convex.