Title :
Numerical methods for pricing callable bonds
Author :
Halluin, Y.D. ; Forsyth, P.A. ; Vetzal, K.R. ; Labahn, G.
Author_Institution :
Dept. of Comput. Sci., Waterloo Univ., Ont., Canada
Abstract :
This work demonstrates that it is possible to obtain accurate values of callable bonds using a fully numerical approach, provided that the PDE is discretized appropriately. To facilitate comparisons with results reported by Buttler and Waldvogel (1996), we consider models with a single factor: the instantaneous risk free interest rate. We emphasize, however, that it is straightforward to extend the numerical methods described to cases where the Green´s function cannot be determined analytically as well as to cases with time-dependent parameters (typically used to match current term structures of interest rates/interest rate volatilities), or multi-factor interest rate models
Keywords :
costing; numerical analysis; partial differential equations; securities trading; Green´s function; PDE; callable bond pricing; instantaneous risk free interest rate; multi-factor interest rate models; numerical approach; time-dependent parameters; Boundary conditions; Computer science; Contracts; Decision making; Economic indicators; Finance; Finite difference methods; Partial differential equations; Pricing; Risk analysis;
Conference_Titel :
Computational Intelligence for Financial Engineering, 2000. (CIFEr) Proceedings of the IEEE/IAFE/INFORMS 2000 Conference on
Conference_Location :
New York, NY
Print_ISBN :
0-7803-6429-5
DOI :
10.1109/CIFER.2000.844604
