Travelling wave solutions of an equation of Harry Dym type arising in the Black-Scholes framework

TL;DR

This paper derives a nonlinear evolution equation related to the Black-Scholes model, specifically a Harry Dym type equation, and finds travelling wave solutions, linking soliton theory with financial market volatility analysis.

Contribution

It introduces a novel nonlinear evolution equation from the Black-Scholes framework and constructs travelling wave solutions using integrable systems techniques.

Findings

Derived a Harry Dym type equation from local volatility models.

Constructed explicit travelling wave solutions.

Established a connection between soliton theory and financial volatility modeling.

Abstract

The Black-Scholes framework is crucial in pricing a vast number of financial instruments that permeate the complex dynamics of world markets. Associated with this framework, we consider a second-order differential operator $L(x, {\partial_x}) := v^2(x,t) (\partial_x^2 -\partial_x)$ that carries a variable volatility term $v(x,t)$ and which is dependent on the underlying log-price $x$ and a time parameter $t$ motivated by the celebrated Dupire local volatility model. In this context, we ask and answer the question of whether one can find a non-linear evolution equation derived from a zero-curvature condition for a time-dependent deformation of the operator $L$. The result is a variant of the Harry Dym equation for which we can then find a family of travelling wave solutions. This brings in extensive machinery from soliton theory and integrable systems. As a by-product, it opens up the way to the use of coherent structures in financial-market volatility studies.