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Stochastic Analysis and Applications Volume 42, 2024 - Issue 1
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Research Article

A mild approach to spatial discretization for backward stochastic differential equations in infinite dimensions

Hani Abidia Department of Informatics and Applied Mathematics, Esprit School of Business, Tunis, TunisiaView further author information
,
Abdelkarim Oualaidb Department of Mathematics, Cadi Ayyad University, Marrakech, MoroccoView further author information
,
Youssef Ouknineb Department of Mathematics, Cadi Ayyad University, Marrakech, Morocco;c Africa Business School, Mohammed VI Polytechnic University, Ben Guerir, MoroccoView further author information
&
Roger Petterssond Department of Mathematics, Linnaeus University, Växjö, SwedenCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-7790-0539View further author information
ORCID Icon
Pages 98-120 | Received 26 Jul 2022, Accepted 04 Apr 2023, Published online: 02 May 2023

References

  • Abidi, H., Ouerdiane, H. (2015). Convergence of scheme for decoupled forward backward stochastic differential equation. Commun. Stoch. Anal. 9(1):19–41. DOI: 10.31390/cosa.9.1.02.
  • Abidi, H., Pettersson, R. (2020). Spatial convergence for semi-linear backward stochastic differential equations in Hilbert space: a mild approach. Comput. Appl. Math. 39(2):94, DOI: 10.1007/s40314-020-1121-0.
  • Bensoussan, A. (1982). Lectures on stochastic control. In: Nonlinear Filtering and Stochastic Control (Cortona, 1981). Lecture Notes in Mathematics, Vol. 972. Berlin-New York: Springer, pp. 1–62.
  • Bensoussan, A. (1983). Stochastic maximum principle for distributed parameter systems. J. Franklin Inst. 315(5–6):387–406. DOI: 10.1016/0016-0032(83)90059-5.
  • Bismut, J. (1973). Conjugate convex functions in optimal stochastic control. J. Math. Anal. Appl. 44(2):384–404. DOI: 10.1016/0022-247X(73)90066-8.
  • Bouchard, B., Touzi, N. (2004). Discrete-time approximation and Monte-Carlo simulation of backward stochastic differential equations. Stoch. Process. Appl. 111(2):175–206. DOI: 10.1016/j.spa.2004.01.001.
  • Brenner, S. C., Ridgway Scott, L. (2008). The Mathematical Theory of Finite Element Methods. Texts in Applied Mathematics, Vol. 15, 3rd ed. New York: Springer.
  • Buckdahn, R., Hu, Y. (1998). Hedging contingent claims for a large investor in an incomplete market. Adv. Appl. Probab. 30(1):239–255. DOI: 10.1239/aap/1035228002.
  • Confortola, F. (2006). Infinite dimensional analysis, quantum probability and related topics. Infin. Dimens. Anal. Quantum. Probab. Relat. Top. 9(1):155–168. DOI: 10.1142/S0219025706002287.
  • Cvitaniç, J., Karatzas, I. (1996). Backward stochastic differential equations with reflection and dynkin games. Ann. Probab. 24(4):2024–2056. DOI: 10.1214/aop/1041903216.
  • Delarue, F., Menozzi, S. (2006). A forward–backward stochastic algorithm for quasi-linear pdes. Ann. Appl. Probab. 16(1):140–184. DOI: 10.1214/105051605000000674.
  • Dunst, T., Prohl, A. (2016). The forward-backward stochastic heat equation: Numerical analysis and simulation. SIAM J. Sci. Comput. 38(5):A2725–A2755. DOI: 10.1137/15M1022951.
  • Fuhrman, M., Hu, Y. (2007). Backward stochastic differential equations in infinite dimensions with continuous driver and applications. Appl. Math. Optim. 56(2):265–302. DOI: 10.1007/s00245-007-0897-2.
  • Fuhrman, M., Tessitore, G. (2004). Infinite horizon backward stochastic differential equations and elliptic equations in hilbert spaces. Ann. Probab. 32(1B):607–660. DOI: 10.1214/aop/1079021459.
  • Gobet, E., Labart, C. (2007). Error expansion for the discretization of backward stochastic differential equations. Stoch. Process. Appl. 117(7):803–829. DOI: 10.1016/j.spa.2006.10.007.
  • Gobet, E., Turkedjiev, P. (2015). Linear regression MDP scheme for discrete backward stochastic differential equations under general conditions. Math. Comput. 85(299):1359–1391. DOI: 10.1090/mcom/3013.
  • Guatteri, G. (2007). On a class of forward-backward stochastic differential systems in infinite dimensions. J. Appl. Math. Stoch. Anal. 2007:1–33. DOI: 10.1155/2007/42640.
  • Guatteri, G., Tessitore, G. (2005). On the backward stochastic riccati equation in infinite dimensions. SIAM J. Control Optim. 44(1):159–194. DOI: 10.1137/S0363012903425507.
  • Hassani, M., Ouknine, Y. (2002). Infinite dimensional bsde with jumps. Stoch. Anal. Appl. 20(3):519–565. DOI: 10.1081/SAP-120004114.
  • Hu, Y., Peng, S. (1990). Maximum principle for semilinear stochastic evolution control systems. Stoch. Stoch. Rep. 33(3–4):159–180. DOI: 10.1080/17442509008833671.
  • Hu, Y., Peng, S. (1991). Adapted solution of a backward semilinear stochastic evolution equation. Stoch. Anal. Appl. 9(4):445–459. DOI: 10.1080/07362999108809250.
  • Protter, P., Ma, J., Yong, J. (1994). Solving forward-backward stochastic differential equations explicitly—a four step scheme. Probab. Theory Relat. Fields. 98(3):339–359. DOI: 10.1007/BF01192258.
  • Johnson, C. (1987). Numerical Solution of Partial Differential Equations by the Finite Element Method. Cambridge: Cambridge University Press.
  • Kruse, R. (2014). Strong and Weak Approximation of Semilinear Stochastic Evolution Equations. Lecture Notes in Mathematics, Vol. 2093. Cham: Springer.
  • Peng, S., El Karoui, N., Quenez, M. (1997). Backward stochastic differential equations in finance. Math. Finance. 7(1):1–71. DOI: 10.1111/1467-9965.00022.
  • Pardoux, É. (1999). BSDEs, weak convergence and homogenization of semilinear PDEs. In: Clarke, F.H., Stern, R.J., eds. Nonlinear Analysis, Differential Equations and Control. Dordrecht: Kluwer Academic Publisher. pp. 503–549.
  • Pardoux, E., Peng, S. (1990). Adapted solution of a backward stochastic differential equation. Syst. Control Lett. 14(1):55–61. DOI: 10.1016/0167-6911(90)90082-6.
  • Prévôt, C., Röckner, M. (2007). A Concise Course on Stochastic Partial Differential Equations. Lecture Notes in Mathematics, Vol. 1905. Berlin: Springer.
  • Thomée, V. (2006). Galerkin Finite Element Methods for Parabolic Problems. Springer Series in Computational Mathematics, Vol. 25, 2nd ed. Berlin: Springer-Verlag.
  • Wang, Y. (2016). A semidiscrete galerkin scheme for backward stochastic parabolic differential equations. Math. Control Relat. Fields. 6(3):489–515. DOI: 10.3934/mcrf.2016013.
  • Zhang, J. (2004). A numerical scheme for bsdes. Ann. Appl. Probab. 14(1):459–488. DOI: 10.1214/aoap/1075828058.

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