December 2016 Solving finite time horizon Dynkin games by optimal switching
Randall Martyr
Author Affiliations +
J. Appl. Probab. 53(4): 957-973 (December 2016).

Abstract

This paper uses recent results on continuous-time finite-horizon optimal switching problems with negative switching costs to prove the existence of a saddle point in an optimal stopping (Dynkin) game. Sufficient conditions for the game's value to be continuous with respect to the time horizon are obtained using recent results on norm estimates for doubly reflected backward stochastic differential equations. This theory is then demonstrated numerically for the special cases of cancellable call and put options in a Black‒Scholes market.

Citation

Download Citation

Randall Martyr. "Solving finite time horizon Dynkin games by optimal switching." J. Appl. Probab. 53 (4) 957 - 973, December 2016.

Information

Published: December 2016
First available in Project Euclid: 7 December 2016

zbMATH: 1348.93282
MathSciNet: MR3581234

Subjects:
Primary: 91A55
Secondary: 60G40 , 91A05 , 91G80

Keywords: Nash equilibrium , Optimal stopping , Optimal stopping game , Optimal switching , saddle point , Snell envelope

Rights: Copyright © 2016 Applied Probability Trust

JOURNAL ARTICLE
17 PAGES

This article is only available to subscribers.
It is not available for individual sale.
+ SAVE TO MY LIBRARY

Vol.53 • No. 4 • December 2016
Back to Top