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Perpetual American options
In: Non-Gaussian Merton-Black-Scholes Theory
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Cited by:
- Yu-Ting Chen & Cheng Few Lee & Yuan-Chung Sheu, 2020.
"An ODE Approach for the Expected Discounted Penalty at Ruin in a Jump-Diffusion Model,"
World Scientific Book Chapters, in: Cheng Few Lee & John C Lee (ed.), HANDBOOK OF FINANCIAL ECONOMETRICS, MATHEMATICS, STATISTICS, AND MACHINE LEARNING, chapter 41, pages 1561-1598,
World Scientific Publishing Co. Pte. Ltd..
- Yu-Ting Chen & Cheng-Few Lee & Yuan-Chung Sheu, 2007. "An ODE approach for the expected discounted penalty at ruin in a jump-diffusion model," Finance and Stochastics, Springer, vol. 11(3), pages 323-355, July.
- Svetlana Boyarchenko & Sergei Levendorski&icaron;, 2007.
"Practical Guide To Real Options In Discrete Time,"
International Economic Review, Department of Economics, University of Pennsylvania and Osaka University Institute of Social and Economic Research Association, vol. 48(1), pages 311-342, February.
- Sergey Levendorskiy & Svetlana Boyarchenko, 2004. "Practical guide to real options in discrete time," Computing in Economics and Finance 2004 137, Society for Computational Economics.
- Svetlana Boyarchenko & Sergei Levendorskii, 2005. "Practical guide to real options in discrete time II," Finance 0501014, University Library of Munich, Germany.
- Svetlana Boyarchenko & Sergei Levendorskii, 2004. "Practical guide to real options in discrete time," Papers cond-mat/0404106, arXiv.org.
- Svetlana Boyarchenko & Sergei Levendorskii, 2004. "Practical guide to real options in discrete time," Finance 0405016, University Library of Munich, Germany.
- Luis Alvarez & Teppo Rakkolainen, 2010. "Investment timing in presence of downside risk: a certainty equivalent characterization," Annals of Finance, Springer, vol. 6(3), pages 317-333, July.
- Sergei Levendorskii, 2002. "Pseudo-diffusions and Quadratic term structure models," Papers cond-mat/0212249, arXiv.org, revised Apr 2004.
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Keywords
Non-Gaussian Models; Merton-Black-Scholes Theory; Levy Processes; American Options; European Options; Feller Processes;All these keywords.
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