The generalized perpetual American exchange-option problem

This paper revisits a general optimal stopping problem that often appears as a special case in some finance applications. The problem is essentially of the same form as the investment-timing problem of McDonald and Siegel (1986) in which the underlying processes are two correlated geometric Brownian motions (GBMs) with drifts less than the discount rate. By contrast, we attempt to analyze the underlying optimal stopping problem to its full generality without imposing any restriction on the drifts of the GBMs. By extending the first passage time approach of Xia and Zhou (2007) to the current context, we manage to obtain a complete and explicit characterization of the solution to the problem on all possible drift domains. Our analysis leads to a new and interesting observation that the underlying optimal stopping problem admits a two-sided optimal continuation region on some certain parameter domains.

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The generalized perpetual American exchange-option problem

Advances in Applied Probability ◽

10.1017/s0001867800002421 ◽

2008 ◽

Vol 40 (01) ◽

pp. 163-182 ◽

Cited By ~ 1

Author(s):

Shek-Keung Tony Wong

Keyword(s):

Optimal Stopping ◽

First Passage Time ◽

Passage Time ◽

Optimal Stopping Problem ◽

Full Generality ◽

Investment Timing ◽

Current Context ◽

Geometric Brownian Motions ◽

Underlying Processes

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On Wald Optimal Stopping Problem for Geometric Brownian Motions

Sequential Analysis ◽

10.1080/07474940802446228 ◽

2008 ◽

Vol 27 (4) ◽

pp. 435-440 ◽

Cited By ~ 1

Author(s):

Cloud Makasu

Keyword(s):

Optimal Stopping ◽

Optimal Stopping Problem ◽

Brownian Motions ◽

Geometric Brownian Motions

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Relative Coordination Reconsidered: A Stochastic Account

Motor Control ◽

10.1123/mcj.2.3.228 ◽

1998 ◽

Vol 2 (3) ◽

pp. 228-240 ◽

Cited By ~ 11

Author(s):

David R. Collins ◽

Hyeongsaeng Park ◽

Michael T. Turvey

Keyword(s):

First Passage Time ◽

Gaussian White Noise ◽

Simulated Data ◽

Passage Time ◽

Model Parameters ◽

Mean First Passage Time ◽

Stationary Probability Distribution ◽

First Passage ◽

Underlying Processes ◽

Relative Coordination

Von Holst (1939/1973) parsed intersegmental coordination into relative and absolute to distinguish moderate and extreme forms. Kelso and DeGuzman (1992) discussed an interpretation of relative coordination in terms of the chaotic phenomenon of intermittency. The data of concern (DeGuzman & Kelso, 1991) do not, however, exclude a stochastic interpretation, which is detailed here following earlier suggestions. The key difference is modeling relative coordination by stochastic variability about weak attractors rather than by deterministic variability about remnants of attractors (”ghost attractors”). The intermittency interpretation is not robust in the presence of noise and, therefore, is not well disposed to account for uncertainty in detailing a model of behavioral data or its parameters. In contrast, the stochastic interpretation is based upon an approximation of unknown underlying processes in the form of Gaussian white noise. A stochastic method for estimating model parameters from a stationary probability distribution and a mean first passage time is illustrated using experimental and simulated data.

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THE SWING OPTION ON THE STOCK MARKET

International Journal of Theoretical and Applied Finance ◽

10.1142/s0219024905002895 ◽

2005 ◽

Vol 08 (01) ◽

pp. 123-139 ◽

Cited By ~ 7

Author(s):

MARTIN DAHLGREN ◽

RALF KORN

Keyword(s):

Optimal Stopping ◽

Value Function ◽

Additional Constraint ◽

Numerical Implementation ◽

Optimal Stopping Problem ◽

Existence Of A Solution ◽

Swing Option ◽

Time Distance ◽

The Value Function

The valuation of a Swing option for stocks under the additional constraint of a minimum time distance between two different exercise times is considered. We give an explicit characterization of its pricing function as the value function of a multiple optimal stopping problem. The solution of this problem is related to a system of variational inequalities. We prove existence of a solution to this system and discuss the numerical implementation of a valuation algorithm.

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Characterization of the class of upward first passage time distributions of birth and death processes and related results

Journal of the Mathematical Society of Japan ◽

10.2969/jmsj/04030477 ◽

1988 ◽

Vol 40 (3) ◽

pp. 477-499 ◽

Cited By ~ 8

Author(s):

Makoto YAMAZATO

Keyword(s):

First Passage Time ◽

Passage Time ◽

First Passage ◽

Birth And Death Processes

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A characterization of first passage time distributions for random walks

Stochastic Processes and their Applications ◽

10.1016/0304-4149(91)90033-9 ◽

1991 ◽

Vol 39 (1) ◽

pp. 81-88 ◽

Cited By ~ 1

Author(s):

Lennart Bondesson

Keyword(s):

Random Walks ◽

First Passage Time ◽

Passage Time ◽

First Passage

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Single Stranded dna Translocation Through a Fluctuating Nanopore

MRS Proceedings ◽

10.1557/proc-790-p7.4 ◽

2003 ◽

Vol 790 ◽

Author(s):

O. Flomenbom ◽

J. Klafter

Keyword(s):

First Passage Time ◽

Passage Time ◽

Dna Translocation ◽

First Passage ◽

Single Stranded Dna ◽

System Parameters ◽

The Mean ◽

Probability Density Function Pdf ◽

Passage Times

ABSTRACTWe investigate the translocation of a single stranded DNA (ssDNA) through a pore, which fluctuates between two conformations, by using coupled master equations (ME). The probability density function (PDF) of the first passage times (FPT) of the translocation process is calculated, displaying a triple, double or mono-peaked behavior, depending on the system parameters. An analytical expression for the mean first passage time (MFPT) of the translocation process is derived, and provides an extensive characterization of the translocation process.

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A canonical optimal stopping problem for American options under a double exponential jump-diffusion model

The Journal of Risk ◽

10.21314/jor.2007.154 ◽

2007 ◽

Vol 10 (1) ◽

pp. 85-100 ◽

Cited By ~ 4

Author(s):

Farid AitSahlia ◽

Andreas Runnemo

Keyword(s):

Diffusion Model ◽

Optimal Stopping ◽

American Options ◽

Jump Diffusion ◽

Optimal Stopping Problem ◽

Double Exponential ◽

Jump Diffusion Model

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First passage time for the state of exact chemical equilibrium

Collection of Czechoslovak Chemical Communications ◽

10.1135/cccc19800777 ◽

1980 ◽

Vol 45 (3) ◽

pp. 777-782 ◽

Cited By ~ 1

Author(s):

Milan Šolc

Keyword(s):

Chemical Equilibrium ◽

First Passage Time ◽

Passage Time ◽

The State ◽

Recurrence Time ◽

First Passage ◽

First Order ◽

The Mean ◽

Passage Times ◽

Number Of Particles

The establishment of chemical equilibrium in a system with a reversible first order reaction is characterized in terms of the distribution of first passage times for the state of exact chemical equilibrium. The mean first passage time of this state is a linear function of the logarithm of the total number of particles in the system. The equilibrium fluctuations of composition in the system are characterized by the distribution of the recurrence times for the state of exact chemical equilibrium. The mean recurrence time is inversely proportional to the square root of the total number of particles in the system.

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