Journal ArticleDOI
A General Framework for Pricing Asian Options Under Markov Processes
Ning Cai,Yingda Song,Steven Kou +2 more
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In this paper, a general framework for pricing both continuously and discretely monitored Asian options under one-dimensional Markov processes is proposed, and the double transform of the Asian option price in terms of the unique bounded solution to a related functional equation is derived.Abstract:
A general framework is proposed for pricing both continuously and discretely monitored Asian options under one-dimensional Markov processes. For each type (continuously monitored or discretely monitored), we derive the double transform of the Asian option price in terms of the unique bounded solution to a related functional equation. In the special case of continuous-time Markov chain (CTMC), the functional equation reduces to a linear system that can be solved analytically via matrix inversion. Thus the Asian option prices under a one-dimensional Markov process can be obtained by first constructing a CTMC to approximate the targeted Markov process model, and then computing the Asian option prices under the approximate CTMC by numerically inverting the double transforms. Numerical experiments indicate that our pricing method is accurate and fast under popular Markov process models, including the CIR model, the CEV model, Merton’s jump diffusion model, the double-exponential jump diffusion model, the varia...read more
Citations
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Journal ArticleDOI
A general framework for time-changed Markov processes and applications
TL;DR: A two-layer approximation scheme is developed by further approximating the driving process in constructing the time change using an independent CTMC and derives the functional equation characterizing the double transforms of the transition matrix of the resulting time-changed CTMC.
Journal ArticleDOI
Error analysis of finite difference and Markov chain approximations for option pricing
Lingfei Li,Gongqiu Zhang +1 more
TL;DR: In this paper, the convergence rate for the transition density and the price of options with nonsmooth payoffs was established for general one-dimensional diffusion models, which play a fundamental role in financial applications.
Journal ArticleDOI
General optimized lower and upper bounds for discrete and continuous arithmetic Asian options
Gianluca Fusai,Ioannis Kyriakou +1 more
TL;DR: In this article, a lower bound approximation of the lower bound in the Fourier domain is derived for Asian options with fixed or floating strike price, discrete or continuous averaging, under a wide range of stochastic dynamic models.
Journal ArticleDOI
Efficient Asian option pricing under regime switching jump diffusions and stochastic volatility models
J. Lars Kirkby,Duy Nguyen +1 more
TL;DR: In this paper, the authors developed a novel and efficient transform method to price Asian options for very general asset dynamics, including regime switching Levy processes and other jump diffusions as well as stochastic volatility models with jumps.
Journal ArticleDOI
Efficient simulation of generalized SABR and stochastic local volatility models based on Markov chain approximations
TL;DR: A novel Monte Carlo simulation method for two-dimensional stochastic differential equation (SDE) systems based on approximation through continuous-time Markov chains (CTMCs) which has potential for applications in other contextual areas in operations research, such as queuing theory.
References
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TL;DR: In this article, the authors present results of both classic and recent matrix analyses using canonical forms as a unifying theme, and demonstrate their importance in a variety of applications, such as linear algebra and matrix theory.
Journal ArticleDOI
Option pricing when underlying stock returns are discontinuous
TL;DR: In this article, an option pricing formula was derived for the more general case when the underlying stock returns are generated by a mixture of both continuous and jump processes, and the derived formula has most of the attractive features of the original Black-Scholes formula.
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Journal ArticleDOI
The fine structure of asset returns: an empirical investigation
TL;DR: In this paper, the authors investigated the importance of diffusion and jumps in a new model for asset returns and concluded that the statistical and risk-neutral processes for equity prices are pure jump processes of infinite activity and finite variation.