Unspanned stochastic volatility term structure models have gained popularity in the literature. This dissertation focuses on the challenges of implementing the simplest case – bivariate unspanned stochastic volatility models, where there is one state variable controlling the term structure, and one scaling the volatility. Specifically, we consider the Log-Affine Double Quadratic (1,1) model of Backwell (2017). In the class of affine term structure models, state variables are virtually always spanned and can therefore be inferred from bond yields. When fitting unspanned models, it is necessary to include option data, which adds further challenges. Because there are no analytical solutions in the LADQ (1,1) model, we show how options can be priced using an Alternating Direction Implicit finite difference scheme. We then implement an Unscented Kalman filter — a non-linear extension of the Kalman filter, which is a popular method for inferring state variable values — to recover the latent state variables from market observable data
Identifer | oai:union.ndltd.org:netd.ac.za/oai:union.ndltd.org:uct/oai:localhost:11427/29266 |
Date | 01 February 2019 |
Creators | Cullinan, Cian |
Contributors | Backwell, Alex |
Publisher | University of Cape Town, Faculty of Science, Department of Mathematics and Applied Mathematics |
Source Sets | South African National ETD Portal |
Language | English |
Detected Language | English |
Type | Masters Thesis, Masters, MPhil |
Format | application/pdf |
Page generated in 0.0124 seconds