Pricing financial claims contingent upon an underlying asset monitored at discrete times

Exotic option contracts typically specify a contingency upon an underlying asset price monitored at a discrete set of times. Yet, techniques used to price such options routinely assume continuous monitoring leading to often substantial price discrepancies. A brief review of relevant option-pricing methods is presented. The pricing problem is transformed into one of Wiener–Hopf type using a z-transform in time and a Fourier transform in the logarithm of asset prices. The Wiener–Hopf technique is used to obtain probabilistic identities for the related random walks killed by an absorbing boundary. An accurate and efficient approximation is obtained using Padé approximants and an approximate inverse z-transform based on the trapezoidal rule. For simplicity, European barrier options in a Gaussian Black–Scholes framework are used to exemplify the technique (for which exact analytic expressions are obtained). Extensions to different option contracts and options driven by other Lévy processes are discussed.

[1]  Per Hörfelt,et al.  Extension of the corrected barrier approximation by Broadie, Glasserman, and Kou , 2003, Finance Stochastics.

[2]  Ward Whitt,et al.  Numerical inversion of probability generating functions , 1992, Oper. Res. Lett..

[3]  Kai Wang Ng,et al.  Pricing Discrete Barrier and Hindsight Options with the Tridiagonal Probability Algorithm , 2001, Manag. Sci..

[4]  F. Delbaen,et al.  A general version of the fundamental theorem of asset pricing , 1994 .

[5]  A. Novikov,et al.  On a new approach to calculating expectations for option pricing , 2002, Journal of Applied Probability.

[6]  M. C. Recchioni,et al.  Analysis of quadrature methods for pricing discrete barrier options , 2007 .

[7]  P. Glasserman,et al.  A Continuity Correction for Discrete Barrier Options , 1997 .

[8]  M. Airoldi A moment expansion approach to option pricing , 2005 .

[9]  Mark Broadie,et al.  Connecting discrete and continuous path-dependent options , 1999, Finance Stochastics.

[10]  S. Kou,et al.  Numerical pricing of discrete barrier and lookback options via Laplace transforms , 2004 .

[11]  I. David Abrahams,et al.  An exact analytical solution for discrete barrier options , 2006, Finance Stochastics.

[12]  F. Black,et al.  The Pricing of Options and Corporate Liabilities , 1973, Journal of Political Economy.

[13]  Y. Yamamoto,et al.  A Double-Exponential Fast Gauss Transform Algorithm for Pricing Discrete Path-Dependent Options , 2005, Oper. Res..

[14]  S. Howison,et al.  A Matched Asymptotic Expansions Approach to Continuity Corrections for Discretely Sampled Options. Part 1: Barrier Options , 2007 .

[15]  S. Kou ON PRICING OF DISCRETE BARRIER OPTIONS , 2003 .

[16]  David M. Kreps,et al.  Martingales and arbitrage in multiperiod securities markets , 1979 .

[17]  J. Harrison,et al.  Martingales and stochastic integrals in the theory of continuous trading , 1981 .

[18]  I. Abrahams The application of Padéapproximants to Wiener–Hopf factorization , 2000 .