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Indifference price with general semimartingales

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  • Sara Biagini
  • Marco Frittelli
  • Matheus R. Grasselli

Abstract

For utility functions $u$ finite valued on $\mathbb{R}$, we prove a duality formula for utility maximization with random endowment in general semimartingale incomplete markets. The main novelty of the paper is that possibly non locally bounded semimartingale price processes are allowed. Following Biagini and Frittelli \cite{BiaFri06}, the analysis is based on the duality between the Orlicz spaces $(L^{\widehat{u}}, (L^{\widehat{u}})^*)$ naturally associated to the utility function. This formulation enables several key properties of the indifference price $\pi(B)$ of a claim $B$ satisfying conditions weaker than those assumed in literature. In particular, the indifference price functional $\pi$ turns out to be, apart from a sign, a convex risk measure on the Orlicz space $L^{\widehat{u}}$.

Suggested Citation

  • Sara Biagini & Marco Frittelli & Matheus R. Grasselli, 2009. "Indifference price with general semimartingales," Papers 0905.4657, arXiv.org.
  • Handle: RePEc:arx:papers:0905.4657
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    Cited by:

    1. Peter Imkeller & Anthony Réveillac & Jianing Zhang, 2011. "SOLVABILITY AND NUMERICAL SIMULATION OF BSDEs RELATED TO BSPDEs WITH APPLICATIONS TO UTILITY MAXIMIZATION," International Journal of Theoretical and Applied Finance (IJTAF), World Scientific Publishing Co. Pte. Ltd., vol. 14(05), pages 635-667.

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