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Mean-Variance Portfolio Selection in Contagious Markets

Yang Shen, Bin Zou

2022SIAM Journal on Financial Mathematics11 citationsDOI

Abstract

We consider a mean-variance portfolio selection problem in a financial market with contagion risk. The risky assets follow a jump-diffusion model, in which jumps are driven by a multivariate Hawkes process with mutual-excitation effect. The mutual-excitation feature of the Hawkes process captures the contagion risk in the sense that each price jump of an asset increases the likelihood of future jumps not only in the same asset but also in other assets. We apply the stochastic maximum principle, backward stochastic differential equation theory, and linear-quadratic control technique to solve the problem and obtain the efficient strategy and efficient frontier in semiclosed form, subject to a nonlocal partial differential equation. Numerical examples are provided to illustrate our results.

Topics & Concepts

PortfolioJump diffusionStochastic differential equationEfficient frontierEconometricsFinancial marketAsset (computer security)JumpQuadratic equationEconomicsMathematicsVariance (accounting)Selection (genetic algorithm)Mathematical economicsApplied mathematicsComputer scienceFinancial economicsFinancePhysicsComputer securityQuantum mechanicsGeometryArtificial intelligenceAccountingPoint processes and geometric inequalitiesInsurance, Mortality, Demography, Risk ManagementStochastic processes and financial applications