Analytic solution of a nonlinear black-scholes partial differential equation

Abstract/Overview

We study a nonlinear Black-Scholes partial differential equation whose nonlinearity is as a result of a feedback effect. This is an illiquid market effect arising from transaction costs. An analytic solution to the nonlinear Black-Scholes equation via a solitary wave solution is currently unknown. After transforming the equation into a parabolic nonlinear porous medium equation, we find that the assumption of a traveling wave profile to the later equation reduces it to ordinary differential equations. This together with the use of localizing boundary conditions facilitate a twice continuously differentiable nontrivial analytic solution by integrating directly.

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APA

Onyango, E (2024). Analytic solution of a nonlinear black-scholes partial differential equation. Afribary. Retrieved from https://afribary.com/works/analytic-solution-of-a-nonlinear-black-scholes-partial-differential-equation

MLA 8th

Onyango, Esekon "Analytic solution of a nonlinear black-scholes partial differential equation" Afribary. Afribary, 04 Jun. 2024, https://afribary.com/works/analytic-solution-of-a-nonlinear-black-scholes-partial-differential-equation. Accessed 24 Nov. 2024.

MLA7

Onyango, Esekon . "Analytic solution of a nonlinear black-scholes partial differential equation". Afribary, Afribary, 04 Jun. 2024. Web. 24 Nov. 2024. < https://afribary.com/works/analytic-solution-of-a-nonlinear-black-scholes-partial-differential-equation >.

Chicago

Onyango, Esekon . "Analytic solution of a nonlinear black-scholes partial differential equation" Afribary (2024). Accessed November 24, 2024. https://afribary.com/works/analytic-solution-of-a-nonlinear-black-scholes-partial-differential-equation