The cap-floor parity relation (2.2.4#eq.3) shows that both share many features with swaps. The contract is again decomposed into elementary intervals and the valuation of every caplet or floorlets is carried out backwards starting from zero, since a finite time has to pass to accumulate interest rate earnings. The incremental change reflects the difference between the spot and the cap-/floor rates; contrary to swaps, this difference can never become negative, since caps and floors do not carry any obligation. Using the Vasicek model, the contract can therefore be viewed as a bond paying a continuously compounded annual coupon of for caplets and for floorlets. By analogy with the swap rate, define the
StrikePrice
),
expressed as the relative annual return above /below which the
contract pays the rate difference, e.g. 0.04 for a cap rate of 4%.
The VMARKET applet below calculates the value of a caplet with a cap rate of 8%, as a function of the spot rate and an increasing time to the maturity.
The same models used to forecast drifts in the interest rate can also be used here, but the volatility should be modified to reflect the uncertainty in the interest earnings (exercise 5.07).
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