Linear and Nonlinear Partial Integro-Differential Equations arising from Finance

TL;DR

This paper reviews recent advances in nonlinear and nonlocal partial integro-differential equations from financial mathematics, focusing on models with jumps, market illiquidity, and solution properties.

Contribution

It extends classical models to include jumps via Le9vy processes and establishes existence, uniqueness, and qualitative properties of solutions for complex PIDEs.

Findings

Models incorporating jumps better capture market behavior.

Existence and uniqueness of solutions are proven under broad conditions.

Qualitative properties of solutions are characterized using semilinear parabolic theory.

Abstract

The purpose of this review paper is to present our recent results on nonlinear and nonlocal mathematical models arising from modern financial mathematics. It is based on our four papers written jointly by J. Cruz, M. Grossinho, D. Sevcovic, and C. Udeani, as well as parts of PhD thesis by J. Cruz. We investigated linear and nonlinear partial integro-differential equations (PIDEs) arising from option pricing and portfolio selection problems and studied the systematic relationships between the PIDEs with option pricing theory and Black--Scholes models. First, we relax the liquid and complete market assumptions and extend the models that study the market's illiquidity to the case where the underlying asset price follows a L\'evy stochastic process with jumps. Then, we establish the corresponding PIDE for option pricing under suitable assumptions. The qualitative properties of solutions to nonlocal linear and nonlinear PIDE are presented using the theory of abstract semilinear parabolic equation in the scale of Bessel potential spaces. The existence and uniqueness of solutions to the PIDE for a general class of the so-called admissible L\'evy measures satisfying suitable growth conditions at infinity and origin are also established in the multidimensional space.