Quadratic Term Structure Models: Theory and Evidence

Ahn, Dong-Hyun; Dittmar, Robert F.; Gallant, A. Ronald

doi:10.2139/ssrn.218728

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Quadratic Term Structure Models: Theory and Evidence

52 Pages Posted: 1 May 2000

See all articles by Dong-Hyun Ahn

Dong-Hyun Ahn

University of North Carolina at Chapel Hill

A. Ronald Gallant

Duke University - Fuqua School of Business, Economics Group; New York University - Department of Economics

There are 2 versions of this paper

Abstract

This paper theoretically explores the characteristics underpinning quadratic term structure models (QTSMs), which designate the yield on a bond as a quadratic function of underlying state variables. We develop a comprehensive QTSM, which is maximally flexible and thus encompasses the features of several diverse models including the double square-root model of Longstaff (1989), the univariate quadratic model of Beaglehole and Tenney (1992), and the Squared Autoregressive Independent Variable Nominal Term Structure (SAINTS) model of Constantinides (1992). We document a complete classification of admissibility and empirical identification for the QTSM, and demonstrate that the QTSM can overcome limitations inherent in affine term structure models (ATSMs). Using the Efficient Method of Moments of Gallant and Tauchen (1996), we test the empirical performance of the model in determining bond prices and compare the performance to the ATSMs. The results of the goodness-of-fit tests suggest that the QTSMs outperform the ATSMs in explaining historical bond price behavior in the US.

JEL Classification: G12, G13

Suggested Citation: Suggested Citation

Ahn, Dong-Hyun and Dittmar, Robert F. and Gallant, A. Ronald, Quadratic Term Structure Models: Theory and Evidence. Available at SSRN: https://ssrn.com/abstract=218728 or http://dx.doi.org/10.2139/ssrn.218728