Advanced search
Publication Cover
Stochastics
An International Journal of Probability and Stochastic Processes
Latest Articles
Submit an article Journal homepage
132
Views
0
CrossRef citations to date
0
Altmetric
Research Article

Discounted nonzero-sum optimal stopping games under Poisson random intervention times

Pavel V. GapeevDepartment of Mathematics, London School of Economics, London, UKCorrespondence[email protected]
Received 03 Oct 2021, Accepted 23 May 2024, Published online: 04 Jun 2024

References

  • E.J. Baurdoux and A.E. Kyprianou, Further calculations for Israeli options, Stochastics 76 (2004), pp. 549–569.
  • E.J. Baurdoux and A.E. Kyprianou, The McKean stochastic game driven by a spectrally negative Lévy process, Electron. J. Probab. 8 (2008), pp. 173–197.
  • E.J. Baurdoux and A.E. Kyprianou, The Shepp-Shiryaev stochastic game driven by a spectrally negative Lévy process, Theory Probab. Appl. 53 (2009), pp. 481–499.
  • E.J. Baurdoux, A.E. Kyprianou, and J.C. Pardo, The Gapeev-Kühn stochastic game driven by a spectrally positive Lévy process, Stoch. Process. Their. Appl. 121 (2011), pp. 1266–1289.
  • E. Bayraktar and M. Sirbu, Stochastic Perron's method and verification without smoothness using viscosity comparison: Obstacle problems and Dynkin games, Proc. Am. Math. Soc. 142 (2014), pp. 1399–1412.
  • M. Beibel and H.R. Lerche, A new look at warrant pricing and related optimal stopping problems, Stat. Sin. 7 (1997), pp. 93–108.
  • A. Bensoussan and A. Friedman, Non-linear variational inequalities and differential games with stopping times, J. Funct. Anal. 16 (1974), pp. 305–352.
  • A. Bensoussan and A. Friedman, Nonzero-sum stochastic differential games with stopping times and free-boundary problems, Trans. Amer. Math. Soc. 231 (1977), pp. 275–327.
  • J.M. Bismut, Sur un problème de Dynkin, Zeitschrift Für Wahrscheinlichtskeitstheorie Und Gverwandte Gebiete 39 (1977), pp. 31–53.
  • A.N. Borodin and P. Salminen, Handbook of Brownian Motion, 2nd ed., Birkhäuser, Basel, 2002.
  • J. Cvitanić and I. Karatzas, Backward stochastic differential equations with reflection and Dynkin games, Ann. Probab. 24 (1996), pp. 2024–2056.
  • J. Detemple, American-Style Derivatives: Valuation and Computation, Chapman and Hall/CRC, Boca Raton, 2006.
  • P. Dupuis and H. Wang, Optimal stopping with random intervention times, Adv. Appl. Probab. 34 (2002), pp. 141–157.
  • E.B. Dynkin, Game variant of a problem on optimal stopping, Sov. Math., Dokl. 10 (1969), pp. 270–274.
  • E. Ekström and G. Peskir, Optimal stopping games for Markov processes, SIAM J. Control Optim.47 (2008), pp. 684–702.
  • E. Ekström and S. Villeneuve, On the value of optimal stopping games, Ann. Appl. Probab. 16 (2006), pp. 1576–1596.
  • N. El-Karoui and S. Hamadène, BSDEs and risk-sensitive control, zero-sum and nonzero-sum game problems of stochastic functional differential equations, Stoch. Process. Their. Appl. 107 (2003), pp. 145–169.
  • A. Friedman, Stochastic games and variational inequalities, Arch. Ration. Mech. Anal. 51 (1973), pp. 321–346.
  • P.V. Gapeev, The spread option optimal stopping game, in Exotic Option Pricing and Advanced Levy Models, A. Kyprianou, W. Schoutens, and P. Wilmott, eds., Wiley, Chichester, 2005, pp. 293–305.
  • P.V. Gapeev, Perpetual double strangle options optimal stopping games, Submitted (2021), p. 20.
  • P.V. Gapeev, Discounted optimal stopping problems in continuous hidden Markov models, Stochastics: An Int. J. Probab. Stochastic Processes 94 (2022), pp. 335–364.
  • P.V. Gapeev, Optimal stopping zero-sum games in continuous hidden Markov models, submitted (2023), p 35.
  • P.V. Gapeev and C. Kühn, Perpetual convertible bonds in jump-diffusion models, Stat. Dec. 23 (2005), pp. 15–31.
  • P.V. Gapeev and H.R. Lerche, On the structure of discounted optimal stopping problems for one-dimensional diffusions, Stochastics: Int. J. Probab. Stochastic Processes 83 (2011), pp. 537–554.
  • X. Guo and J. Liu, Stopping at the maximum of geometric Brownian motion when signals are received, J. Appl. Probab. 42 (2005), pp. 826–838.
  • S. Hamadène and J.P. Lepeltier, Backward equations, stochastic control and zero-sum stochastic dierential games, Stochastics Stochastic Rep. 54 (1995), pp. 221–231.
  • S. Hamadène and J.P. Lepeltier, Zero-sum stochastic dierential games and backward equations, Syst. Control Lett. 24 (1995), pp. 259–263.
  • S. Hamadène, J.P. Lepeltier, and S. Peng, BSDE with continuous coefficients and application to Markovian non-zero sum stochastic dierential games, in Pitman Research Notes in Mathematics Series, 364, N. El-Karoui and L. Mazliak, eds., Longman, Harlow 1997, pp. 115–128.
  • D.G. Hobson, The shape of the value function under Poisson optimal stopping, Stoch. Process. Their. Appl. 133 (2021), pp. 229–246.
  • J. Kallsen and C. Kühn, Pricing derivatives of American and game type in incomplete markets, Finance Stochastics 8 (2004), pp. 261–284.
  • I. Karatzas and S.E. Shreve, Brownian Motion and Stochastic Calculus, 2nd ed., Springer, New York, 1991.
  • I. Karatzas and H. Wang, Connections between bounded-variation control and Dynkin games, in Optimal Control and Partial Differential Equations 363 (Volume in Honour of Alain Bensoussan), J.L. Menaldi et al., eds., IOS Press, Amsterdam, 2001, pp. 363–373.
  • Y. Kifer, Game options, Finance Stochastics 4 (2000), pp. 443–463.
  • N.V. Krylov, Control of Markov processes and W-spaces, Izvestija 5 (1971), pp. 233–266.
  • C. Kühn and A.E. Kyprianou, Callable puts as composite exotic options, Math. Finance 17 (2007), pp. 487–502.
  • A.E. Kyprianou, Some calculations for Israeli options, Finance Stochastics 8 (2004), pp. 73–86.
  • J. Lempa and H. Saarinen, A zero-sum Poisson stopping game with asymmetric signal rates, Appl. Math. Optim. 87, 35 (2023), pp. 1–32.
  • J.P. Lepeltier and M.A. Mainguenau, Le jeu de Dynkin en théorie générale sans l'hypothèse de Mokobodski, Stochastics 13 (1984), pp. 25–44.
  • G. Liang and H. Sun, Dynkin games with Poisson random intervention times, SIAM J. Control Optim.57 (2019), pp. 2962–2991.
  • H.R. Lerche and D. Stich, A harmonic function approach to Nash-equilibria of Kifer-type stopping games, Stat. Risk Model. 30 (2013), pp. 169–180.
  • R.S. Liptser and A.N. Shiryaev, Statistics of Random Processes I, 2nd ed., Springer, Berlin, 2001.
  • J. Neveu, Discrete-Parameter Martingales, North-Holland, Amsterdam, 1975.
  • B. Øksendal, Stochastic Differential Equations. An Introduction with Applications, 4th ed., Springer, Berlin, 1998.
  • G. Peskir, A change-of-variable formula with local time on curves, J. Theor. Probab. 18 (2005), pp. 499–535.
  • G. Peskir, Optimal stopping games and Nash equilibrium, Theory Probab. Appl. 53 (2008), pp. 558–571.
  • G. Peskir, A duality principle for the Legendre transform, J. Convex. Anal.19 (2012), pp. 609–630.
  • G. Peskir and A.N. Shiryaev, Optimal Stopping and Free-Boundary Problems, Birkhäuser, Basel, 2006.
  • S. Qiu, American strangle options, Research Rep. Probability and Statistics Group, School of Mathematics, The University of Manchester, 22 2014.
  • L.C.G. Rogers and O. Zane, A simple model of liquidity effects, in Advances in Finance and Stochastics (Essays in Honour of Dieter Sondermann), K. Sandmann and P. Schönbucher, eds., Springer, Berlin, 2000, pp. 161–176.
  • D. Revuz and M. Yor, Continuous Martingales and Brownian Motion, 3rd ed., Springer, Berlin, 2005.
  • A.N. Shiryaev, Optimal Stopping Rules, Springer, Berlin, 1978.
  • A.N. Shiryaev, Essentials of Stochastic Finance, World Scientific, Singapore, 1999.
  • L. Stettner, On a general zero-sum stochastic game with optimal stopping, Probab. Math. Stat. 3 (1982), pp. 103–112.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.