Sensitivity analysis of path-dependent options in an incomplete market with pathwise functional Ito calculus

Abstract

Functional Ito calculus is based on an extension of the classical Ito calculus to functionals depending on the entire past evolution of the underlying paths and not only on its current value. The calculus builds on Follmer's deterministic proof of the Ito formula, see [3], and a notion of pathwise functional derivatives introduced by [5]. There are no smoothness assumptions required on the functionals, however, they are required to possess certain directional derivatives which may be computed pathwise, see [6, 9, 8]. Using functional Ito calculus and the notion of quadratic variation, we derive the functional Ito formula along with the Feynman-Kac formula for functional processes. Furthermore, we express the Greeks for path-dependent options as expectations, which can be efficiently computed numerically using Monte Carlo simulations. We illustrate these results by applying the formulae to digital options within the Black-Scholes model framework.

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