Please use this identifier to cite or link to this item: http://hdl.handle.net/123456789/1917
Title: Spectral study of options based on CEV model with multidimensional volatility
Authors: Буртняк, Іван Володимирович
Малицька, Ганна Петрівна
Keywords: CEV model, stochastic multidimensional volatility, spectral theory, singular perturbation theory, regular perturbation theory
Issue Date: 14-Jan-2018
Publisher: LLC “СPС “Business Perspectives” Hryhorii Skovoroda lane, 10, Sumy, 40022, Ukraine
Citation: Ivan Burtnyak and Anna Malytska (2018). Spectral study of options based on CEV model with multidimensional volatility. Investment Management and Financial Innovations, 15(1), 18-25.
Abstract: This article studies the derivatives pricing using a method of spectral analysis, a theory of singular and regular perturbations. Using a risk-neutral assessment, the authors obtain the Cauchy problem, which allows to calculate the approximate price of derivative assets and their volatility based on the diffusion equation with fast and slow variables of nonlocal volatility, and they obtain a model with multidimensional stochastic volatility. Applying a spectral theory of self-adjoint operators in Hilbert space and a theory of singular and regular perturbations, an analytic formula for approximate asset prices is established, which is described by the CEV model with stochastic volatility dependent on -fast l variables and -slowly r variables, 1, 1, lr ≥≥ , l N r N ∈∈ and a local variable. Applying the Sturm-Liouville theory, Fredholm’s alternatives, as well as the analysis of singular and regular perturbations at different time scales, the authors obtained explicit formulas for derivatives price approximations. To obtain explicit formulae, it is necessary to solve 2l Poisson equations.
URI: http://hdl.handle.net/123456789/1917
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