Abstract.
Motivated by an optimal investment problem under time horizon uncertainty and when default may occur, we study a general structure for an incomplete semimartingale model extending the classical terminal wealth utility maximization problem. This modelling leads to the formulation of a wealth-path dependent utility maximization problem. Our main result is an extension of the well-known dual formulation to this context. In contrast with the usual duality approach, we work directly on the primal problem. Sufficient conditions for characterizing the optimal solution are also provided in the case of complete markets, and are illustrated by examples.
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Received: December 2003,
Mathematics Subject Classification (2000):
91B28, 91B16, 49N15, 49N30
JEL Classification:
G11
The authors would like to thank the anonymous referees for their remarks and suggestions which greatly improved this paper. We also thank participants at the Oberwolfach workshop in 2003 for comments and discussions.
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Bouchard, B., Pham, H. Wealth-path dependent utility maximization in incomplete markets. Finance and Stochastics 8, 579–603 (2004). https://doi.org/10.1007/s00780-004-0125-8
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DOI: https://doi.org/10.1007/s00780-004-0125-8