Volterra equation for pricing and hedging in a regime switching market

Saini, Ravi Kant; GOSWAMI, ANINDYA

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dc.contributor.author	GOSWAMI, ANINDYA	en_US
dc.contributor.author	Saini, Ravi Kant	en_US
dc.date.accessioned	2019-02-25T09:05:30Z
dc.date.available	2019-02-25T09:05:30Z
dc.date.issued	2014-08	en_US
dc.identifier.citation	Cogent Economics and Finance, 2 (1),	en_US
dc.identifier.issn	2332-2039	en_US
dc.identifier.uri	http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/2087
dc.identifier.uri	https://doi.org/10.1080/23322039.2014.939769	en_US
dc.description.abstract	It is known that the risk minimizing price of European options in Markov-modulated market satisfies a system of coupled PDE, known as generalized B–S–M PDE. In this paper, another system of equations, which can be categorized as a Volterra integral equations of second kind, are considered. It is shown that this system of integral equations has smooth solution and the solution solves the generalized B–S–M PDE. Apart from showing existence and uniqueness of the PDE, this IE representation helps to develop a new computational method. It enables to compute the European option price and corresponding optimal hedging strategy by using quadrature method.	en_US
dc.language.iso	en	en_US
dc.publisher	Taylor & Francis	en_US
dc.subject	Markov modulated market	en_US
dc.subject	locally risk minimizing option price	en_US
dc.subject	Black-Scholes	en_US
dc.subject	Merton equations	en_US
dc.subject	Volterra equation	en_US
dc.subject	Quadrature method	en_US
dc.subject	2014	en_US
dc.title	Volterra equation for pricing and hedging in a regime switching market	en_US
dc.type	Article	en_US
dc.contributor.department	Dept. of Mathematics	en_US
dc.identifier.sourcetitle	Cogent Economics and Finance	en_US
dc.publication.originofpublisher	Foreign	en_US