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Likelihood ratio gradient estimation for Meixner distribution and Lévy processes

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journal contribution
posted on 2012-03-05, 11:07 authored by Reiichiro Kawai
We address the problem of gradient estimation with respect to four characterizing parameters of the Meixner distribution and Lévy process. With the help of the explicit marginal probability density function, the likelihood ratio method is directly applicable, while unbiased estimators may contain infinite random series in their score function. We quantify the estimator bias arising when the infinite series is truncated to finite term. We further propose a substantially simple exact simulation method for the Meixner distribution, based on acceptance-rejection sampling and the Esscher density transform. Numerical results are presented in the context of financial Greeks to illustrate the effectiveness of our formulas along with bias estimates.

History

Citation

Computational Statistics, 2012 (in press)

Author affiliation

/Organisation/COLLEGE OF SCIENCE AND ENGINEERING/Department of Mathematics

Version

  • AM (Accepted Manuscript)

Published in

Computational Statistics

Publisher

Springer-Verlag

issn

0943-4062

eissn

1613-9658

Copyright date

2011

Available date

2012-03-08

Publisher version

http://www.springer.com/statistics/journal/180

Notes

The original publication is available at www.springerlink.com

Language

en

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