Discontinuity of Value Functions of Certain Options with Barriers

10 Pages Posted: 2 Jan 2009 Last revised: 5 Jan 2009

See all articles by Mitya Boyarchenko

Mitya Boyarchenko

University of Michigan - Department of Mathematics

Date Written: January 1, 2009

Abstract

In this note we prove the following statements, conjectured by Sergei Levendorskii (private communication). Consider a first-touch digital option in a L'evy-driven model, where the underlying Levy process has finite variance and drifts away from the barrier (in other words, we assume that the drift is strictly positive in the case of a down-and-in option, and strictly negative in the case of an up-and-in option). The value function of this option has a discontinuity at the barrier. A similar result is valid for a knock-out barrier option under certain assumptions on the terminal payoff function (these assumptions hold in all examples that arise in practice). Both perpetual and finite-lived options are considered in this article.

Keywords: Option pricing, barrier options, first-touch digitals, Levy processes, discontinuity

JEL Classification: G13

Suggested Citation

Boyarchenko, Mitya, Discontinuity of Value Functions of Certain Options with Barriers (January 1, 2009). Available at SSRN: https://ssrn.com/abstract=1322285 or http://dx.doi.org/10.2139/ssrn.1322285

Mitya Boyarchenko (Contact Author)

University of Michigan - Department of Mathematics ( email )

530 Church Street
2074 East Hall
Ann Arbor, MI 48109
United States

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