Calibrating the Mean-Reversion Parameter in the Hull-White Model Using Neural Networks

Interest rate models are widely used for simulations of interest rate movements and pricing of interest rate derivatives. We focus on the Hull-White model, for which we develop a technique for calibrating the speed of mean reversion. We examine the theoretical time-dependent version of mean reversion function and propose a neural network approach to perform the calibration based solely on historical interest rate data. The experiments indicate the suitability of depth-wise convolution and provide evidence for the advantages of neural network approach over existing methodologies. The proposed models produce mean reversion comparable to rolling-window linear regression’s results, allowing for greater flexibility while being less sensitive to market turbulence.

[1]  Frédéric Patras,et al.  Analysis, detection and correction of misspecified discrete time state space models , 2018, J. Comput. Appl. Math..

[2]  Hariharan Narayanan,et al.  Sample Complexity of Testing the Manifold Hypothesis , 2010, NIPS.

[3]  Oldrich A. Vasicek An equilibrium characterization of the term structure , 1977 .

[4]  Yann LeCun,et al.  A theoretical framework for back-propagation , 1988 .

[5]  Achilleas Zapranis,et al.  Weather derivatives pricing: Modeling the seasonal residual variance of an Ornstein-Uhlenbeck temperature process with neural networks , 2009, Neurocomputing.

[6]  Sumitra Mukherjee,et al.  Deep networks for predicting direction of change in foreign exchange rates , 2017, Intell. Syst. Account. Finance Manag..

[7]  Calibration Methods of Hull-White Model , 2009 .

[8]  Alan G. White,et al.  Pricing Interest-Rate-Derivative Securities , 1990 .

[9]  Farzan Aminian,et al.  The use of Neural Networks for modeling nonlinear mean reversion: Measuring efficiency and integration in ADR markets , 2012, 2012 IEEE Conference on Computational Intelligence for Financial Engineering & Economics (CIFEr).

[10]  Alexandros Iosifidis,et al.  Forecasting Stock Prices from the Limit Order Book Using Convolutional Neural Networks , 2017, 2017 IEEE 19th Conference on Business Informatics (CBI).

[11]  Achilleas Zapranis,et al.  Modelling the Temperature Time‐dependent Speed of Mean Reversion in the Context of Weather Derivatives Pricing , 2008 .

[12]  Andres Hernandez Model Calibration with Neural Networks , 2016 .