Open AccessPricing Vulnerable Options in the Bifractional Brownian Environment with Jumps
Author(s) -
Panhong Cheng,
Zhihong Xu
Publication year - 2021
Publication title -
journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.252
H-Index - 13
eISSN - 2314-4785
pISSN - 2314-4629
DOI - 10.1155/2021/1451692
Subject(s) - jump diffusion , mathematics , counterparty , black–scholes model , valuation (finance) , valuation of options , risk neutral measure , econometrics , geometric brownian motion , mathematical economics , model risk , actuarial science , jump , credit risk , diffusion process , economics , risk management , finance , volatility (finance) , physics , economy , quantum mechanics , service (business)
In this paper, we study the valuation of European vulnerable options where the underlying asset price and the firm value of the counterparty both follow the bifractional Brownian motion with jumps, respectively. We assume that default event occurs when the firm value of the counterparty is less than the default boundary. By using the actuarial approach, analytic formulae for pricing the European vulnerable options are derived. The proposed pricing model contains many existing models such as Black–Scholes model (1973), Merton jump-diffusion model (1976), Klein model (1996), and Tian et al. model (2014).
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