集值倒向随机微分方程

IF 1.4 2区 数学 Q2 STATISTICS & PROBABILITY
Çağın Ararat, Jin Ma, Wenqian Wu
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引用次数: 5

摘要

在本文中,我们建立了一个研究集值后向随机微分方程(集值BSDE)的分析框架,主要是受当前多资产或基于网络的金融模型的动态集值风险度量研究的启发。我们的框架将利用集合之间的Hukuhara差异的概念,以弥补传统Minkowski加法中“逆”运算的不足,从而弥补集值分析中向量空间结构的不足。在证明一类集值BSDEs的适定性的同时,我们还将讨论关于广义Aumann-Itô积分的一些基本问题,特别是当它与鞅表示定理相联系时。特别地,我们提出了一些必要的积分扩展,可以用来表示具有非单点初值的集值鞅。这一扩展对于集值BSDEs的研究是必不可少的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Set-valued backward stochastic differential equations
In this paper, we establish an analytic framework for studying set-valued backward stochastic differential equations (set-valued BSDE), motivated largely by the current studies of dynamic set-valued risk measures for multi-asset or network-based financial models. Our framework will make use of the notion of the Hukuhara difference between sets, in order to compensate the lack of “inverse” operation of the traditional Minkowski addition, whence the vector space structure in set-valued analysis. While proving the well-posedness of a class of set-valued BSDEs, we shall also address some fundamental issues regarding generalized Aumann–Itô integrals, especially when it is connected to the martingale representation theorem. In particular, we propose some necessary extensions of the integral that can be used to represent set-valued martingales with nonsingleton initial values. This extension turns out to be essential for the study of set-valued BSDEs.
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来源期刊
Annals of Applied Probability
Annals of Applied Probability 数学-统计学与概率论
CiteScore
2.70
自引率
5.60%
发文量
108
审稿时长
6-12 weeks
期刊介绍: The Annals of Applied Probability aims to publish research of the highest quality reflecting the varied facets of contemporary Applied Probability. Primary emphasis is placed on importance and originality.
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