The Duration and Convexity of a Bond Portfolio

The subject of the Master’s thesis is a complex vanilla bond theory aiming at the interest rate sensitivity. The thesis consists of several chapters. While in the first chapter, the bonds are characterized purely theoretically as securities in financial markets, in Chapter 2, the basic principles of financial mathematics are applied to them and their valuation is discussed, including the bond value computations at coupon payment date and at any date between the payment dates as well as in ex-coupon dates, accrued interest, price types and several yield types and their bases. The third chapter discusses the risk theory related to the bonds and is followed by Chapter 4 which gives the analysis of the major bond risk, the interest rate risk. The chapter discusses Taylor’s series and its application into the bond interest rate sensitivity using duration and convexity serving to portfolio immunization. In addition, the computations of duration and convexity at any point are shown with some closed-form formulas. In the last chapter, the immunization with duration is illustrated by historical data obtained from Thomson Reuters Datastream platform.