Massimo Costabile scite author profile

We propose a model for pricing both European and American Asian options based on the arithmetic average of the underlying asset prices. Our approach relies on a binomial tree describing the underlying asset evolution. At each node of the tree we associate a set of representative averages chosen among all the effective averages realized at that node. Then, we use backward recursion and linear interpolation to compute the option price. Copyright Springer Science + Business Media, LLC 2006Asian options, Binomial algorithms, Discrete-time models,

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A combinatorial approach for pricing Parisian options

Costabile

2002

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This paper provides a discrete time algorithm, in the framework of the Cox-Ross-Rubinstein analysis (1979), to evaluate both Parisian options with a flat barrier and Parisian options with an exponential boundary. The algorithm is based on a combinatorial tool for counting the number of paths of a particle performing a random walk, that remains beyond a barrier constantly for a period strictly smaller than a pre-specified time interval. As a result, a binomial evaluation model is derived that is very easy to implement and that produces highly accurate prices. (2000): 05A10, 91B28 Mathematics Subject Classification

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Option pricing under regime-switching jump–diffusion models

Costabile

Leccadito

Massabó

et al. 2014

Journal of Computational and Applied Mathematics

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a b s t r a c tWe present an explicit formula and a multinomial approach for pricing contingent claims under a regime-switching jump-diffusion model. The explicit formula, obtained as an expectation of Merton-type formulae for jump-diffusion processes, allows to compute the price of European options in the case of a two-regime economy with lognormal jumps, while the multinomial approach allows to accommodate an arbitrary number of regimes and a generic jump size distribution, and is suitable for pricing American-style options. The latter algorithm discretizes log-returns in each regime independently, starting from the highest volatility regime where a recombining multinomial lattice is established. In the remaining regimes, lattice nodes are the same but branching probabilities are adjusted. Derivative prices are computed by a backward induction scheme.

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A reduced lattice model for option pricing under regime-switching

Costabile

Leccadito

Massabó

et al. 2013

Rev Quant Finan Acc

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A Simplified Approach to Approximate Diffusion Processes Widely Used in Finance

Costabile¹,

Massabó²

2010

JOD

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