Optimizing the terminal wealth under partial information: The drift process as a continuous time Markov chain
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[1] John B. Moore,et al. Hidden Markov Models: Estimation and Control , 1994 .
[2] I. Karatzas,et al. A generalized clark representation formula, with application to optimal portfolios , 1991 .
[3] Robert J. Elliott,et al. New finite-dimensional filters and smoothers for noisily observed Markov chains , 1993, IEEE Trans. Inf. Theory.
[4] Ioannis Karatzas,et al. An extension of clark' formula , 1991 .
[5] J. Detemple,et al. A Monte Carlo Method for Optimal Portfolios , 2000 .
[6] Vikram Krishnamurthy,et al. Time discretization of continuous-time filters and smoothers for HMM parameter estimation , 1996, IEEE Trans. Inf. Theory.
[7] J. M. Clark. The Design of Robust Approximations to the Stochastic Differential Equations of Nonlinear Filtering , 1978 .
[8] S. Peng,et al. Risk-Sinsitive Dynamic Portfolio Optimization with Partial Information on Infinite Time Horizon , 2002 .
[9] A. Dembo,et al. Parameter estimation of partially observed continuous time stochastic processes via the EM algorithm , 1992 .
[10] I. Karatzas,et al. Option Pricing, Interest Rates and Risk Management: Bayesian Adaptive Portfolio Optimization , 2001 .
[11] W. Whitt,et al. Portfolio choice and the Bayesian Kelly criterion , 1996, Advances in Applied Probability.
[12] H. Pham,et al. Optimal Portfolio in Partially Observed Stochastic Volatility Models , 2001 .
[13] Robert J. Elliott,et al. Drift and volatility estimation in discrete time , 1998 .
[14] P. Lakner. Optimal trading strategy for an investor: the case of partial information , 1998 .
[15] Yoichi Kuwana,et al. CERTAINTY EQUIVALENCE AND LOGARITHMIC UTILITIES IN CONSUMPTION/INVESTMENT PROBLEMS , 1995 .
[16] Wolfgang J. Runggaldier,et al. A Stochastic Control Approach to Risk Management Under Restricted Information , 2000 .
[17] Robert J. Elliott,et al. Estimating the implicit interest rate of a risky asset , 1994 .
[18] Peter Lakner,et al. Utility maximization with partial information , 1995 .
[19] Marc Yor,et al. Changes of filtrations and of probability measures , 1978 .
[20] I. Karatzas,et al. A Note On Utility Maximization Under Partial Observations , 1991 .
[21] Daniel Ocone. Malliavin's calculus and stochastic integral representations of functional of diffusion processes † , 1984 .
[22] A. Shiryayev,et al. Statistics of Random Processes I: General Theory , 1984 .
[23] W. Wonham. Some applications of stochastic difierential equations to optimal nonlinear ltering , 1964 .