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Optimal Portfolios in Lévy Markets under State-Dependent Bounded Utility Functions

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  • José E. Figueroa-López
  • Jin Ma

Abstract

Motivated by the so-called shortfall risk minimization problem, we consider Merton's portfolio optimization problem in a non-Markovian market driven by a Lévy process, with a bounded state-dependent utility function. Following the usual dual variational approach , we show that the domain of the dual problem enjoys an explicit “parametrization,†built on a multiplicative optional decomposition for nonnegative supermartingales due to Föllmer and Kramkov (1997). As a key step we prove a closure property for integrals with respect to a fixed Poisson random measure, extending a result by Mémin (1980). In the case where either the Lévy measure ν of Z has finite number of atoms or Δ S t / S t − = ζ t ϑ ( Δ Z t ) for a process ζ and a deterministic function ϑ , we characterize explicitly the admissible trading strategies and show that the dual solution is a risk-neutral local martingale.

Suggested Citation

  • José E. Figueroa-López & Jin Ma, 2010. "Optimal Portfolios in Lévy Markets under State-Dependent Bounded Utility Functions," International Journal of Stochastic Analysis, Hindawi, vol. 2010, pages 1-27, March.
  • Handle: RePEc:hin:jnijsa:236587
    DOI: 10.1155/2010/236587
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