On existence and uniqueness of solutions to uncertain backward stochastic differential equations

On existence and uniqueness of solutions to uncertain backward stochastic differential equations

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摘要 This paper is concerned with a class of uncertain backward stochastic differential equations （UBSDEs） driven by both an m-dimensional Brownian motion and a d-dimensional canonical process with uniform Lipschitzian coefficients. Such equations can be useful in mod- elling hybrid systems, where the phenomena are simultaneously subjected to two kinds of un- certainties： randomness and uncertainty. The solutions of UBSDEs are the uncertain stochastic processes. Thus, the existence and uniqueness of solutions to UBSDEs with Lipschitzian coeffi- cients are proved. This paper is concerned with a class of uncertain backward stochastic differential equations （UBSDEs） driven by both an m-dimensional Brownian motion and a d-dimensional canonical process with uniform Lipschitzian coefficients. Such equations can be useful in mod- elling hybrid systems, where the phenomena are simultaneously subjected to two kinds of un- certainties： randomness and uncertainty. The solutions of UBSDEs are the uncertain stochastic processes. Thus, the existence and uniqueness of solutions to UBSDEs with Lipschitzian coeffi- cients are proved.

作者 FEI Wei-yin

机构地区 School of Mathematics and Physics

出处《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2014年第1期53-66,共14页 高校应用数学学报（英文版）（B辑）

基金 Supported by National Natural Science Foundation of China(71171003,71210107026) Anhui Natural Science Foundation(10040606003) Anhui Natural Science Foundation of Universities(KJ2012B019,KJ2013B023)

关键词 Uncertain backward stochastic differential equations(UBSDEs) canonical process existence and uniqueness Lipschitzian condition martingale representation theorem Uncertain backward stochastic differential equations(UBSDEs),canonical process,existence and uniqueness,Lipschitzian condition,martingale representation theorem

分类号 O211.63 [理学—概率论与数理统计] O211.6 [理学—概率论与数理统计]

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1FEI Wei-yin.Optimal consumption-leisure, portfolio and retirement selection based on α-maxmin expected CES utility with ambiguity[J].Applied Mathematics(A Journal of Chinese Universities),2012,27(4):435-454. 被引量：23
2Wei-yin FEI,Deng-Feng XIA,Shu-guang ZHANG.Solutions to BSDEs Driven by Both Standard and Fractional Brownian Motions[J].Acta Mathematicae Applicatae Sinica,2013,29(2):329-354. 被引量：5

二级参考文献65

1S Basak. On the fluctuations in consumption and market returns in the presence of labor and human capital: An equilibrium analysis, J Econom Dynam Control, 1999, 23: 1029-1064.
2Z Bodie, J B Detemple, S Otruba, S Walter. Optimal consumption portfolio choices and retirement planning, J Econom Dynam Control, 2004, 28: 1115-1148.
3Z Bodie, R C Merton, W F Samuelson. Labor supply flexibility and portfolio choice in a life cycle model, J Econom Dynam Control, 1992, 16: 427-449.
4A Chateauneuf, F Maccheroni, M Marinacci, J M Tallon. Monotone continuous multiple priors, Econom Theory, 2005, 26: 973-982.
5Z Chen, L G Epstein. Ambiguity, risk, and asset returns in continuous time, Econometrica, 2002, 70: 1403-1443.
6K J Choi, G Shim. Disutility, optimal retirement, and portfolio selection, Math Finance, 2006, 16: 443-467.
7K J Choi, G Shim, Y H Shin. Optimal portfolio consumption-leisure and retirement choice problem with CES utility, Math Finance, 2008, 18: 445-472.
8M S Eichenbaum, L P Hansen, K J Singelton. A time series analysis of representative agent models of consumption and leisure choice under uncertainty, Q J Econ, 1988, 103: 51-78.
9D Ellsberg. Risk, ambiguity, and the Savage axioms, Q J Econ, 1961, 75: 643-699.
10N EI Karoui, S Peng, M C Quenez. Backward stochastic differential equations in finance, Math Fi?nance, 1997, 7: 1-71.

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2刘宏建,费为银,祖纷,汪如瑾.股价波动率具有模型不确定的最优消费与投资问题[J].工程数学学报,2014,31(1):35-43. 被引量：3
3石学芹,费为银,胡慧敏,鲍品娟.奈特不确定环境下固定供款型养老基金最优投资策略[J].中国科学技术大学学报,2014,44(3):188-193. 被引量：3
4费为银,李钰,石学芹,李娟.奈特不确定和部分信息下的最优交易策略[J].应用数学学报,2014,37(2):193-205. 被引量：13
5费为银,姚远浩,夏登峰.奈特不确定下带有红利支付的养老金最优投资策略[J].东华大学学报（自然科学版）,2014,40(4):497-502. 被引量：2
6费为银,夏登峰,刘鹏.模型不确定和极端事件冲击下带通胀的最优投资组合选择问题研究[J].应用概率统计,2014,30(3):322-336. 被引量：9
7余敏秀,费为银,夏登峰.Markov切换具有Knight不确定下最优消费和投资组合研究[J].应用概率统计,2014,30(4):353-371. 被引量：3
8刘宏建,费为银,朱永王,郑安曼.Knight不确定下考虑保险和退休的最优消费-投资和遗产问题研究[J].运筹学学报,2014,18(3):88-98. 被引量：10
9费为银,刘鹏,夏登峰.极端事件冲击下含糊厌恶投资者的最优投资组合选择问题[J].中国科学技术大学学报,2014,44(9):724-731. 被引量：4
10费为银,吕会影,余敏秀.通胀服从均值回复过程的最优消费和投资决策[J].系统工程学报,2014,29(6):791-798. 被引量：20

1Ping ZhangInstitute of Mathematics,Chinese Academy of Sciences,Beijing 100080,P.R.ChinaYuxi ZhengDepartment of Mathematics,Indiana University,Bloomington,Indiana 47405 USA.On the Existence and Uniqueness of Solutions to an Asymptotic Equation of a Variational Wave Equation[J].Acta Mathematica Sinica,English Series,1999,15(1):115-129. 被引量：2
2Xin Ying XU Jun Ning ZHAO.On the Global Existence and Uniqueness of Solutions to Prandtl's System[J].Acta Mathematica Sinica,English Series,2009,25(1):109-132.
3LIU Jian-liang,SUN Yao,YANG Jian,LIU Wei-yi,CHEN Wei-min.Optimal sensor scheduling for hybrid estimation[J].Journal of Central South University,2013,20(8):2186-2194.
4SU XIN-WEI.Solutions to Boundary Value Problem of Nonlinear Impulsive Differential Equation of Fractional Order[J].Communications in Mathematical Research,2011,27(2):114-126. 被引量：1
5洪世煌,胡适耕.EXISTENCE AND UNIQUENESS OF SOLUTIONS FOR INITIAL VALUE PROBLEMS OF SECOND ORDER ORDINARY DIFFERENTIAL EQUATIONS IN BANACH SPACES[J].Applied Mathematics and Mechanics(English Edition),1999,20(3):290-299.
6Zhi Li,Liping Xu,Jiaowan Luo.L^p SOLUTIONS TO BSDES WITH MONOTONIC AND UNIFORMLY CONTINUOUS GENERATORS[J].Annals of Differential Equations,2015,31(2):175-181.
7Wei-yin FEI,Deng-Feng XIA,Shu-guang ZHANG.Solutions to BSDEs Driven by Both Standard and Fractional Brownian Motions[J].Acta Mathematicae Applicatae Sinica,2013,29(2):329-354. 被引量：5
8PEI Ming-he,Sung-Kag Chang.Existence and Uniqueness of Solutions for Higher Order Nonlinear Multi-point Boundary Value Problems[J].Chinese Quarterly Journal of Mathematics,2009,24(2):258-266. 被引量：7
9Xue-peng BAI,Yi-qing LIN.On the Existence and Uniqueness of Solutions to Stochastic Differential Equations Driven by G-Brownian Motion with Integral-Lipschitz Coefficients[J].Acta Mathematicae Applicatae Sinica,2014,30(3):589-610. 被引量：8
10武力兵,孙涛,何希勤.The Existence and Uniqueness of Solutions to Systems of Second-order Ordinary Differential Equations Boundary Value Problem in Absract Space[J].Chinese Quarterly Journal of Mathematics,2011,26(4):573-577. 被引量：2

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On existence and uniqueness of solutions to uncertain backward stochastic differential equations

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