# Constant maturity swap

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A **constant maturity swap**, also known as a **CMS**, is a swap that allows the purchaser to fix the duration of received flows on a swap.

The floating leg of an interest rate swap typically resets against a published index. The floating leg of a constant maturity swap fixes against a point on the swap curve on a periodic basis.

A constant maturity swap is an interest rate swap where the interest rate on one leg is reset periodically, but with reference to a market swap rate rather than LIBOR. The other leg of the swap is generally LIBOR, but may be a fixed rate or potentially another constant maturity rate. Constant maturity swaps can either be single currency or cross currency swaps. Therefore, the prime factor for a constant maturity swap is the shape of the forward implied yield curves. A single currency constant maturity swap versus LIBOR is similar to a series of differential interest rate fixes (or "DIRF") in the same way that an interest rate swap is similar to a series of forward rate agreements. Valuation of constant maturity swaps depend on volatilities of different forward rates and therefore requires a stochastic yield curve model or some approximated methodology like a convexity adjustment, see for example Brigo and Mercurio (2006).

## Example[edit]

A customer believes that the six-month LIBOR rate will fall relative to the three-year swap rate for a given currency. To take advantage of this curve steepening, he buys a constant maturity swap paying the six-month LIBOR rate and receiving the three-year swap rate.

## References[edit]

- Damiano Brigo and Fabio Mercurio (2006).
*Interest-Rate Models: Theory and Practice - with Smile, Inflation and Credit*, Springer Verlag, 2nd ed. 2006. - Constant Maturity Swaps, Forward Measure and LIBOR Market Model, Dariusz Gatarek.

## External links[edit]

- Interest Rate Exotics: The Gamma Trap
*Risk*Magazine (2006), Navroz Patel^{[permanent dead link]}