We explore the pricing of compound derivatives under the newly introduced conjugate-power Dagum distribution. Assuming a discrete-time multiplicative conjugate-power Dagum random walk, we first provide an alternative derivation of the price of a married put based on a change of measure, which is helpful for the pricing of compound options. Then, we apply these results to obtain the equivalent of the Roll-Geske-Whaley formula for the pricing of American options in presence of one known discrete dividend under this alternative distribution.
Compound Option Pricing and the Roll-Geske-Whaley Formula under the Conjugate-Power Dagum Distribution / Carr P.; Maglione F.. - In: THE JOURNAL OF DERIVATIVES. - ISSN 1074-1240. - ELETTRONICO. - 30:(2022), pp. 94-125. [10.3905/jod.2022.1.172]
Compound Option Pricing and the Roll-Geske-Whaley Formula under the Conjugate-Power Dagum Distribution
Maglione F.
2022
Abstract
We explore the pricing of compound derivatives under the newly introduced conjugate-power Dagum distribution. Assuming a discrete-time multiplicative conjugate-power Dagum random walk, we first provide an alternative derivation of the price of a married put based on a change of measure, which is helpful for the pricing of compound options. Then, we apply these results to obtain the equivalent of the Roll-Geske-Whaley formula for the pricing of American options in presence of one known discrete dividend under this alternative distribution.
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