arXiv:1805.06246 Abstract | arXiv Analytics

arXiv:1805.06246 [math.PR]Abstract References Reviews Resources

Uniqueness of solution to scalar BSDEs with $L\exp{\left(μ \sqrt{2\log{(1+L)}}\,\right)}$-integrable terminal values

Published 2018-05-16Version 1

In [4], the existence of the solution is proved for a scalar linearly growing backward stochastic differential equation (BSDE) if the terminal value is $L\exp{\left(\mu \sqrt{2\log{(1+L)}}\,\right)}$-integrable with the positive parameter $\mu$ being bigger than a critical value $\mu\_0$. In this note, we give the uniqueness result for the preceding BSDE.

Categories: math.PR

Keywords: integrable terminal values, scalar bsdes, uniqueness, growing backward stochastic differential equation, scalar linearly growing backward stochastic

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arXiv:1805.06246 [math.PR]Abstract References Reviews Resources

Uniqueness of solution to scalar BSDEs with $L\exp{\left(μ \sqrt{2\log{(1+L)}}\,\right)}$-integrable terminal values

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arXiv:1805.06246 [math.PR]AbstractReferencesReviewsResources

Uniqueness of solution to scalar BSDEs with $L\exp{\left(μ \sqrt{2\log{(1+L)}}\,\right)}$-integrable terminal values

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arXiv:1805.06246 [math.PR]Abstract References Reviews Resources