Converse comparison theorems for multidimensional anticipated backward stochastic differential equations
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[1] Ying Hu,et al. On the comparison theorem for multidimensional BSDEs , 2006 .
[2] J. Bismut. Linear Quadratic Optimal Stochastic Control with Random Coefficients , 1976 .
[3] Qianru Wang,et al. Lp (1 < p ⩽ 2) solutions of one-dimensional BSDEs whose generator is weakly monotonic in y and non-Lipschitz in z , 2019, Commun. Stat. Simul. Comput..
[4] P. Madec. Ergodic BSDEs and related PDEs with Neumann boundary conditions under weak dissipative assumptions , 2013, 1310.5498.
[5] Shige Peng,et al. Anticipated backward stochastic differential equations , 2007, 0705.1822.
[6] A converse comparison theorem for anticipated BSDEs and related non-linear expectations , 2013 .
[7] Ying Hu,et al. A Converse Comparison Theorem for BSDEs and Related Properties of g-Expectation , 2000 .
[8] S. Peng. Nonlinear Expectations, Nonlinear Evaluations and Risk Measures , 2004 .
[9] S. Peng,et al. Adapted solution of a backward stochastic differential equation , 1990 .
[10] Xinwei Feng. Anticipated Backward Stochastic Differential Equation with Reflection , 2016, Commun. Stat. Simul. Comput..
[11] Yong Ren,et al. Anticipated backward stochastic differential equations on Markov chains , 2013 .
[12] A local strict comparison theorem and converse comparison theorems for reflected backward stochastic differential equations , 2006, math/0701021.
[13] Representation and converse comparison theorems for multidimensional BSDEs , 2017 .
[14] G. D. Nunno,et al. BSDEs driven by time-changed Lévy noises and optimal control , 2013, 1312.5120.