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Multiscale Intensity Models for Single Name Credit Derivatives

Multiscale Intensity Models for Single Name Credit Derivatives We study the pricing of defaultable derivatives, such as bonds, bond options, and credit default swaps in the reduced form framework of intensity‐based models. We use regular and singular perturbation expansions on the intensity of default from which we derive approximations for the pricing functions of these derivatives. In particular, we assume an Ornstein‐Uhlenbeck process for the interest rate, and a two‐factor diffusion model for the intensity of default. The approximation allows for computational efficiency in calibrating the model. Finally, empirical evidence on the existence of multiple scales is presented by the calibration of the model on corporate yield curves. Work partially supported by NSF grants DMS‐0306357 and DMS‐0456195. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Applied Mathematical Finance Taylor & Francis

Multiscale Intensity Models for Single Name Credit Derivatives

Papageorgiou, E.; Sircar, R.
Applied Mathematical Finance , Volume 15 (1): 33 – Feb 1, 2008
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33 pages

Multiscale Intensity Models for Single Name Credit Derivatives

Abstract

We study the pricing of defaultable derivatives, such as bonds, bond options, and credit default swaps in the reduced form framework of intensity‐based models. We use regular and singular perturbation expansions on the intensity of default from which we derive approximations for the pricing functions of these derivatives. In particular, we assume an Ornstein‐Uhlenbeck process for the interest rate, and a two‐factor diffusion model for the intensity of default. The...
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Publisher
Taylor & Francis
Copyright
Copyright Taylor & Francis Group, LLC
ISSN
1466-4313
eISSN
1350-486X
DOI
10.1080/13504860701352222
Publisher site
See Article on Publisher Site

Abstract

We study the pricing of defaultable derivatives, such as bonds, bond options, and credit default swaps in the reduced form framework of intensity‐based models. We use regular and singular perturbation expansions on the intensity of default from which we derive approximations for the pricing functions of these derivatives. In particular, we assume an Ornstein‐Uhlenbeck process for the interest rate, and a two‐factor diffusion model for the intensity of default. The approximation allows for computational efficiency in calibrating the model. Finally, empirical evidence on the existence of multiple scales is presented by the calibration of the model on corporate yield curves. Work partially supported by NSF grants DMS‐0306357 and DMS‐0456195.

Journal

Applied Mathematical FinanceTaylor & Francis

Published: Feb 1, 2008

Keywords: Defaultable bond; credit default swap; defaultable bond option; asymptotic approximation; time scales; JEL classification : G12; G13

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