Numerical Analysis of Yield Curves Implied by Two-Factor Interest Rate Models
Abstract
Abstract
We investigate the yield curves implied by coupon bonds in models where the market short
rate is given by a two-factor stochastic model. Specifically, we investigate generalisations
of the two-factor Vasicek, Cox-Ingersoll-Ross, and mixed models where the two Brownian
motions that feature in each model are allowed to have nonzero constant correlation. We
also study the two-factor Rendlemann-Bartter model with nonzero constant correlation. In
all these models, we manage to recreate the four yield curve shapes commonly discussed in
the literature; normal, steep, inverted, and flat. We also investigate how some of the interest
rate model parameters affect the qualitative properties of the yield curves produced, and
compare the yield curves obtained in the different models.
Degree
Student essay