Bronstein, A L; Hughston, L P; Pistorius, M R and Zervos, M. 2006. Discretionary Stopping of One-Dimensional Itô Diffusions with a Staircase Reward Function. Journal of Applied Probability, 43(4), 984 - 986. ISSN 0021-9002 [Article]

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Abstract or Description

We consider the problem of optimally stopping a general one-dimensional Ito diffusion X. In particular, we solve the problem that aims at maximising the performance criterion E-x exp(- integral(tau)(0) r(X-S) ds)f (X-tau) over all stopping times tau, where the reward function f can take only a finite number of values and has a 'staircase' form. This problem is partly motivated by applications to financial asset pricing. Our results are of an explicit analytic nature and completely characterise the optimal stopping time. Also, it turns out that the problem's value function is not C-1, which is due to the fact that the reward function f is not continuous.

Item Type:	Article
Identification Number (DOI):	https://doi.org/10.1239/jap/1165505202
Departments, Centres and Research Units:	Computing
Dates:	Date Event 1 December 2006 Published 1 December 2006 Accepted
Item ID:	31346
Date Deposited:	07 Feb 2022 16:59
Last Modified:	07 Feb 2022 19:08
Peer Reviewed:	Yes, this version has been peer-reviewed.
URI:	https://research.gold.ac.uk/id/eprint/31346

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