Discounted optimal stopping problems in first-passage time models with random thresholds

Gapeev, Pavel V.; Motairi, Hessah Al

doi:10.1017/jpr.2021.85

Cited by 2 publications

(1 citation statement)

References 40 publications

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“…The difference is that Wu and Li (2022) analyze the finite-time maturity. Gapeev and Motairi (2022) consider the perpetual American cancelable dividend-paying put and call option in the Black-Merton-Scholes market, where the cancellation times are assumed to occur when the underlying risky asset price process hits some unobservable random thresholds. They proved that the optimal stopping times are the first times at which the asset price reaches stochastic boundaries depending on the current values of its running maximum and minimum processes.…”

Section: Introductionmentioning

confidence: 99%

Last-Passage American Cancelable Option in Lévy Models

Palmowski

Stȩpniak

2023

JRFM

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We derive the explicit price of the perpetual American put option canceled at the last-passage time of the underlying above some fixed level. We assume that the asset process is governed by a geometric spectrally negative Lévy process. We show that the optimal exercise time is the first moment when the asset price process drops below an optimal threshold. We perform numerical analysis considering classical Black–Scholes models and the model where the logarithm of the asset price has additional exponential downward shocks. The proof is based on some martingale arguments and the fluctuation theory of Lévy processes.

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Section: Introductionmentioning

confidence: 99%

Last-Passage American Cancelable Option in Lévy Models

Palmowski

Stȩpniak

2023

JRFM

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Discounted optimal stopping zero-sum games in diffusion type models with maxima and minima

Gapeev

2024

Adv. Appl. Probab.

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We present a closed-form solution to a discounted optimal stopping zero-sum game in a model based on a generalised geometric Brownian motion with coefficients depending on its running maximum and minimum processes. The optimal stopping times forming a Nash equilibrium are shown to be the first times at which the original process hits certain boundaries depending on the running values of the associated maximum and minimum processes. The proof is based on the reduction of the original game to the equivalent coupled free-boundary problem and the solution of the latter problem by means of the smooth-fit and normal-reflection conditions. We show that the optimal stopping boundaries are partially determined as either unique solutions to the appropriate system of arithmetic equations or unique solutions to the appropriate first-order nonlinear ordinary differential equations. The results obtained are related to the valuation of the perpetual lookback game options with floating strikes in the appropriate diffusion-type extension of the Black–Merton–Scholes model.

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Discounted optimal stopping problems in first-passage time models with random thresholds

Cited by 2 publications

References 40 publications

Last-Passage American Cancelable Option in Lévy Models

Last-Passage American Cancelable Option in Lévy Models

Discounted optimal stopping zero-sum games in diffusion type models with maxima and minima

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