Download This PaperOn Correlating Lévy Processes
17 Pages Posted: 28 Jan 2010 Last revised: 13 May 2010
Date Written: September 8, 2009
Abstract
A relatively simple approach to correlating unit period returns of Lévy processes is developed. We write the Lévy process as a time changed Brownian motion and correlate the Brownian motions. It is shown that sample correlations understate the required correlation between the Brownian motions and we show how to correct for this. Pairwise tests illustrate the adequacy of the model and the significant improvement offered over the Gaussian alternative. We therefore advocate that the correlated time change model is a simple basic alternative to dependence modeling. From the perspective of explaining portfolio returns in higher dimensions we find adequacy for long-short portfolios. The long only portfolios appear to require a more complex modeling of dependency. We leave these questions for future research.
Keywords: Dependence Modeling, Levy Copulas, Multivariate Subordination, Long-Short vs. Long only Portfolios, Variance Gamma, Time Changed Brownian Motion
JEL Classification: G1, G12, G13
Suggested Citation: Suggested Citation
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