Discounted Optimal Stopping for Maxima of some Jump-Diffusion Processes
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Abstract
We present solutions to some discounted optimal stopping problems for the maximum process in a model driven by a Brownian motion and a compound Poisson process with exponential jumps. The method of proof is based on reducing the initial problems to integro-differential free-boundary problems where the normal reflection and smooth fit may break down and the latter then be replaced by the continuous fit. The results can be interpreted as pricing perpetual American lookback options with fixed and floating strikes in a jump-diffusion model.
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Keywords
Brownian motion, Discounted optimal stopping problem, maximum process, normal reflection, a change-of-variable formula with local time on surfaces, integro-differential free-boundary problem, continuous and smooth fit, compound Poisson process, perpetual lookback American options
Dewey Decimal Classification
330 Wirtschaft
Citation
Gapeev, Pavel V..(2006). Discounted Optimal Stopping for Maxima of some Jump-Diffusion Processes. Sonderforschungsbereich 649: Ökonomisches Risiko. , 2006,59. 10.18452/3989