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Existence and uniqueness of solution to scalar BSDEs with $L\exp\left(μ\sqrt{2\log(1+L)}\right)$-integrable terminal values: the critical case

arXiv:1904.02761

Abstract

In \cite{HuTang2018ECP}, the existence of the solution is proved for a scalar linearly growing backward stochastic differential equation (BSDE) when the terminal value is $L\exp\left(μ\sqrt{2\log(1+L)}\right)$-integrable for a positive parameter $μ>μ_0$ with a critical value $μ_0$, and a counterexample is provided to show that the preceding integrability for $μ<μ_0$ is not sufficient to guarantee the existence of the solution. Afterwards, the uniqueness result (with $μ>μ_0$) is also given in \cite{BuckdahnHuTang2018ECP} for the preceding BSDE under the uniformly Lipschitz condition of the generator. In this note, we prove that these two results still hold for the critical case: $μ=μ_0$.

10 pages