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Auteurs principaux: Fan, Shengjun, Hu, Ying, Tang, Shanjian
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2410.08748
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author Fan, Shengjun
Hu, Ying
Tang, Shanjian
author_facet Fan, Shengjun
Hu, Ying
Tang, Shanjian
contents This paper is devoted to a general solvability of multi-dimensional non-Markovian backward stochastic differential equations (BSDEs) with interactively quadratic generators. Some general structures of the generator $g$ are posed for both local and global existence and uniqueness results on BSDEs, which admit a general growth of the generator $g$ in the state variable $y$, and a quadratic growth of the $i$th component $g^i$ both in the $j$th row $z^j$ of the state variable $z$ for $j\neq i$ (by which we mean the ``{\it interactively quadratic}" growth) and in the $i$th row $z^i$ of $z$. We first establish an existence and uniqueness result on local bounded solutions and then several existence and uniqueness results on global bounded and unbounded solutions. They improve several existing works in the non-Markovian setting, and also incorporate some interesting examples, one of which is a partial answer to the problem posed in \citet{Jackson2023SPA}. A comprehensive study on the bounded solution of one-dimensional quadratic BSDEs with unbounded stochastic parameters is provided for deriving our main results.
format Preprint
id arxiv_https___arxiv_org_abs_2410_08748
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Multi-dimensional non-Markovian backward stochastic differential equations of interactively quadratic generators
Fan, Shengjun
Hu, Ying
Tang, Shanjian
Probability
This paper is devoted to a general solvability of multi-dimensional non-Markovian backward stochastic differential equations (BSDEs) with interactively quadratic generators. Some general structures of the generator $g$ are posed for both local and global existence and uniqueness results on BSDEs, which admit a general growth of the generator $g$ in the state variable $y$, and a quadratic growth of the $i$th component $g^i$ both in the $j$th row $z^j$ of the state variable $z$ for $j\neq i$ (by which we mean the ``{\it interactively quadratic}" growth) and in the $i$th row $z^i$ of $z$. We first establish an existence and uniqueness result on local bounded solutions and then several existence and uniqueness results on global bounded and unbounded solutions. They improve several existing works in the non-Markovian setting, and also incorporate some interesting examples, one of which is a partial answer to the problem posed in \citet{Jackson2023SPA}. A comprehensive study on the bounded solution of one-dimensional quadratic BSDEs with unbounded stochastic parameters is provided for deriving our main results.
title Multi-dimensional non-Markovian backward stochastic differential equations of interactively quadratic generators
topic Probability
url https://arxiv.org/abs/2410.08748