Optimal stopping for the exponential of a Brownian bridge

In this paper we study the problem of stopping a Brownian bridge $X$ in order to maximise the expected value of an exponential gain function. In particular, we solve the stopping problem $$\sup_{0\le \tau\le 1}\E[\mathrm{e}^{X_\tau}]$$ which was posed by Ernst and Shepp in their paper [Commun. Stoch. Anal., 9 (3), 2015, pp. 419--423] and was motivated by bond selling with non-negative prices. Due to the non-linear structure of the exponential gain, we cannot rely on methods used in the literature to find closed-form solutions to other problems involving the Brownian bridge. Instead, we develop techniques that use pathwise properties of the Brownian bridge and martingale methods of optimal stopping theory in order to find the optimal stopping rule and to show regularity of the value function.

[1]  A. Dvoretzky Existence and properties of certain optimal stopping rules , 1967 .

[2]  Y. Kitapbayev,et al.  Integral equations for Rost's reversed barriers: existence and uniqueness results , 2015, 1508.05858.

[3]  L. Shepp Explicit Solutions to Some Problems of Optimal Stopping , 1969 .

[4]  Tiziano De Angelis,et al.  A Note on the Continuity of Free-Boundaries in Finite-Horizon Optimal Stopping Problems for One-Dimensional Diffusions , 2013, SIAM J. Control. Optim..

[5]  K. Glover Optimally stopping a Brownian bridge with an unknown pinning time: A Bayesian approach , 2019, Stochastic Processes and their Applications.

[6]  K. Glover Optimal Stopping of a Brownian Bridge with an Uncertain Pinning Time , 2019 .

[7]  H. Föllmer Optimal stopping of constrained Brownian motion , 1972, Journal of Applied Probability.

[8]  Philip A. Ernst,et al.  REVISITING A THEOREM OF L.A. SHEPP ON OPTIMAL STOPPING , 2015, 1605.00762.

[9]  M. Avellaneda,et al.  A market-induced mechanism for stock pinning , 2003 .

[10]  S. Shreve,et al.  Methods of Mathematical Finance , 2010 .

[11]  Optimal Timing to Trade along a Randomized Brownian Bridge , 2017, International Journal of Financial Studies.

[12]  G. Peskir ON THE AMERICAN OPTION PROBLEM , 2005 .

[13]  J. L. Pedersen,et al.  Solving Non-Linear Optimal Stopping Problems by the Method of Time-Change , 2000 .

[14]  I. Kim The Analytic Valuation of American Options , 1990 .

[15]  Erik Ekstrom,et al.  Optimal stopping of a Brownian bridge with an unknown pinning point , 2017, Stochastic Processes and their Applications.

[16]  D. Lamberton,et al.  Variational inequalities and the pricing of American options , 1990 .

[17]  T. D. Angelis,et al.  The dividend problem with a finite horizon , 2016, 1609.01655.

[18]  P. Moerbeke On optimal stopping and free boundary problems , 1973, Advances in Applied Probability.

[19]  Optimal double stopping of a Brownian bridge , 2014, Advances in Applied Probability.

[20]  G. Iori,et al.  Modeling stock pinning , 2008 .

[21]  William M. Boyce Stopping rules for selling bonds , 1970 .

[22]  G. Peskir,et al.  Global $C^{1}$ regularity of the value function in optimal stopping problems , 2018, The Annals of Applied Probability.

[23]  P. Bassanini,et al.  Elliptic Partial Differential Equations of Second Order , 1997 .

[24]  Erik Ekström,et al.  Optimal Stopping of a Brownian Bridge , 2009, Journal of Applied Probability.