Pricing American Parisian options under general time-inhomogeneous Markov models
基于连续时间马尔可夫链近似,为一般时间非齐次马尔可夫模型下的多种美式巴黎期权(敲入/敲出、永久/有限期限)开发了定价方法,并证明了收敛性。
This paper develops general approaches for pricing various types of American-style Parisian options (down-in/-out, perpetual/finite-maturity) with general payoff functions. These approaches are based on a continuous-time Markov chain (CTMC) approximation under general 1D time-inhomogeneous Markov models. For the down-in types, by conditioning on the Parisian stopping time, we reduce the pricing problem to that of a series of vanilla American options with different maturities; further integrating their prices against the distribution function of the Parisian stopping time then yields the American Parisian down-in option price. This facilitates an efficient application of CTMC approximation, in which the required quantities are calculated to obtain the approximate option price. For the perpetual down-in cases under time-homogeneous models, the computational cost can be substantially reduced. The down-out cases are more complicated: we use the state augmentation approach to record the excursion duration, then the approximate option price is obtained by recursively solving a series of variational inequalities using Lemke's pivoting method. We prove the convergence of CTMC approximation for all types of American Parisian options under general time-inhomogeneous Markov models, and the accuracy and efficiency of our algorithms are confirmed through extensive numerical experiments.