A Markovian regime-switching stochastic differential game for portfolio risk minimization

Author

Elliott, Robert J. ; Siu, Tak Kuen

Author_Institution

Haskayne Sch. of Bus., Univ. of Calgary, Calgary, AB

fYear

2008

fDate

11-13 June 2008

Firstpage

1017

Lastpage

1022

Abstract

A risk minimization problem is considered in a continuous-time Markovian regime-switching financial model modulated by a continuous-time, finite-state Markov chain. We interpret the states of the chain as different market regimes. A convex risk measure is used as a measure of risk and an optimal portfolio is determined by minimizing the convex risk measure of the terminal wealth. We explore the state of the art of the stochastic differential game to formulate the problem as a Markovian regime-switching version of a two-player, zero- sum stochastic differential game. A verification theorem for the Hamilton-Jacobi-Bellman (HJB) solution of the game is provided.

Keywords

Markov processes; banking; continuous time systems; risk management; stochastic games; Hamilton-Jacobi-Bellman solution; Markovian regime-switching financial model; banking; continuous-time system; finite-state Markov chain; risk minimization problem; stochastic differential game; Density measurement; Finance; Financial management; Game theory; Mathematics; Motion measurement; Portfolios; Reactive power; Risk management; Stochastic processes;

fLanguage

English

Publisher

ieee

Conference_Titel

American Control Conference, 2008

Conference_Location

Seattle, WA

ISSN

0743-1619

Print_ISBN

978-1-4244-2078-0

Electronic_ISBN

0743-1619

Type

conf

DOI

10.1109/ACC.2008.4586625

Filename

4586625