REFERENCES

F. Black, E. Derman, and W. Toy (1990). A one-factor model of interest rates and its application to Treasury bond options. Financial Analysts Journal (January–February): 24–32.

G. W. Jr. Buetow, B. Hanke, and F. J. Fabozzi (2001). The impact of different interest rate models on effective duration, effective convexity, and option-adjusted spreads. Journal of Fixed Income, (December): 41–53.

G. Buetow, and J. Sochacki (2001). Term-Structure Models Using Binomial Trees. Charlottesville, VA: The Research Foundation of the CFA Institute.

F. J. Fabozzi (2006). Fixed Income Mathematics. New York: McGraw-Hill.

F. J. Fabozzi (1999). Duration, Convexity, and Other Bond Risk Measures. Hoboken, NJ: John Wiley & Sons.

F. J. Fabozzi, G. W. Jr. Buetow, and R. B. Johnson (2005). Measuring interest-rate risk. In F. J.Fabozzi (ed.), The Handbook of Fixed Income Securities, 7th edition (pp. 183–228). New York: McGraw-Hill.

B. W. Golub (2006). Approaches for measuring duration of mortgage-related securities. In F. J.Fabozzi (ed.), The Handbook of Mortgage-Backed Securities, 6th edition (pp. 823–856). New York: McGraw-Hill.

D. P. Jacob, and T. Lu (2006). Duration and average-life drift of CMOs. In F. J.Fabozzi (ed.), The Handbook of Mortgage-Backed Securities, 6th edition (pp. 857–867). New York: McGraw-Hill.

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