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Bond market completeness and attainable contingent claims

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  • Erik Taflin

Abstract

A general class, introduced in [7], of continuous time bond markets driven by a standard cylindrical Brownian motion $\bar{W}$ in $\ell^{2}$ is considered. We prove that there always exist non-hedgeable random variables in the space $\textsf{D}_{0}=\cap_{p \geq 1}L^{p}$ and that $\textsf{D}_{0}$ has a dense subset of attainable elements, if the volatility operator is non-degenerate a.e. Such results were proved in [1] and [2] in the case of a bond market driven by finite dimensional Brownian motions and marked point processes. We define certain smaller spaces $\textsf{D}_{s}$ , s > 0, of European contingent claims by requiring that the integrand in the martingale representation with respect to $\bar{W}$ takes values in weighted $\ell^{2}$ spaces $\ell^{s,2}$ , with a power weight of degree s. For all s > 0, the space $\textsf{D}_{s}$ is dense in $\textsf{D}_{0}$ and is independent of the particular bond price and volatility operator processes. A simple condition in terms of $\ell^{s,2}$ norms is given on the volatility operator processes, which implies if satisfied that every element in $\textsf{D}_{s}$ is attainable. In this context a related problem of optimal portfolios of zero coupon bonds is solved for general utility functions and volatility operator processes, provided that the $\ell^{2}$ -valued market price of risk process has certain Malliavin differentiability properties. Copyright Springer-Verlag Berlin/Heidelberg 2005

Suggested Citation

  • Erik Taflin, 2005. "Bond market completeness and attainable contingent claims," Finance and Stochastics, Springer, vol. 9(3), pages 429-452, July.
  • Handle: RePEc:spr:finsto:v:9:y:2005:i:3:p:429-452
    DOI: 10.1007/s00780-005-0156-9
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    Citations

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    Cited by:

    1. Micha{l} Barski & Jacek Jakubowski & Jerzy Zabczyk, 2008. "On incompleteness of bond markets with infinite number of random factors," Papers 0809.2270, arXiv.org, revised Jan 2016.
    2. Oleksii Mostovyi, 2014. "Utility maximization in the large markets," Papers 1403.6175, arXiv.org, revised Oct 2014.
    3. Erik Taflin, 2009. "Generalized integrands and bond portfolios: Pitfalls and counter examples," Papers 0909.2341, arXiv.org, revised Jan 2011.

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