References
- Barles , G. and Souganidis , P.E. 1991 . Convergence of approximation schemes for fully nonlinear second order equations . Asymptot. Anal. , 4 : 271 – 283 .
- Benth , F.E. , Karlsen , K.H. and Reikvam , K. 2001 . Optimal portfolio selection with consumption and nonlinear integro-differential equations with gradient constraint: A viscosity solution approach . Finance Stoch. , 3 : 275 – 303 .
- Bouchard , B. and Touzi , N. 2004 . Discrete time approximation and Monte Carlo simulation of backward stochastic differential equations . Stoch. Processes Appl. , 111 : 175 – 206 .
- Bouzguenda , A.Z. and Mnif , M. 2009 . Portfolio optimization with stochastic volatilities: A backward approach . Submitted
- Crandall , M.G. and Lions , P.L. 1986 . On existence and uniqueness of solutions of Hamilton-Jacobi equations . Nonlinear Anal. , 4 : 353 – 370 .
- Crandall , M.G. , Ishii , H. and Lions , P.L. 1992 . User's guide to viscosity solutions of second order partial differential equations . Bull. Ame. Math. Soc. , 27 : 1 – 67 .
- Duffie , D. and Zariphopoulou , T. 1993 . Optimal investment with undiversible income risk . Mathematical Finance , 3 : 135 – 148 .
- Duffie , D. , Fleming , W. , Soner , M. and Zariphopoulou , T. 1997 . Hedging in incomplete markets with HARA utility functions . J. Econ. Dyn. Control , 21 : 753 – 782 .
- Fleming , W.H. and Soner , H.M. 1993 . Controlled Markov Processes and Viscosity solutions , New York : Springer-Verlag .
- Gobet , E. , Lemor , J.P. and Warin , X. 2005 . A regression based Monte Carlo method to solve backward stochastic differential equations . Ann. Appl. Probab. , 15 ( 3 ) : 2172 – 2202 .
- Gobet , E. , Lemor , J.P. and Warin , X. 2006 . Rate of convergence of an empirical regression method for solving generalized backward stochastic differential equations . Bernoulli , 12 ( 5 ) : 889 – 916 .
- Howard , R.A. 1960 . Dynamic Programming and Markov Processes , Cambridge, MA : MIT Press .
- Karatzas , I. , Lehoczky , J.P. , Sethi , S. and Shreve , S. 1986 . Explicit solution of a general consumption-investment problem . Math. Oper. Res. , 11 : 261 – 294 .
- Lapeyre , B. , Sulem , A. and Talay , D. 2009 . Understanding Numerical Analysis for Option Pricing , Edited by: Rogers , L.C.G. and Talay , D. Cambridge : Cambridge University Press . Submitted
- Lions , P.-L. 1983 . Optimal control of diffusions processes and Hamilton–Jacobi Bellman equations. Part I: The dynamic programming principle and applications. Part 2: Viscosity solutions and uniqueness . Comm. PDE 8 , : 1101 – 1174 and 1229–1276 .
- Merton , R. 1971 . Optimum consumption and portfolio rules in a continuous-time model . J. Econ. Theory , 3 : 373 – 413 .
- Pham , H. 2002 . Smooth solutions to optimal investment models with stochastic volatilities and portfolio constraints . Appl. Math. optim. , 46 : 55 – 78 .
- Zariphopoulou , T. 2001 . A solution approach to valuation with unhedgeable risks . Finance Stoch. , 5 : 61 – 82 .
- Zhang , J. 2004 . A numerical scheme for BSDEs . Ann. Appl. Probab. , 14 ( 1 ) : 459 – 488 .