BermudanSwaption: Bermudan swaption valuation using several short-rate models
In eddelbuettel/rquantlib: R Interface to the 'QuantLib' Library
BermudanSwaption R Documentation
Bermudan swaption valuation using several short-rate models
Description
BermudanSwaption prices a Bermudan swaption with specified
strike and maturity (in years), after calibrating the selected
short-rate model to an input swaption volatility matrix. Swaption
maturities are in years down the rows, and swap tenors are in years
along the columns, in the usual fashion. It is assumed that the
Bermudan swaption is
exercisable on each reset date of the underlying swaps.
Usage
BermudanSwaption(params, ts, swaptionMaturities, swapTenors,
volMatrix)
Arguments
params
A list specifying the tradeDate (month/day/year),
settlementDate, startDate, maturity, payFixed
flag, strike, pricing method, and curve construction options
(see Examples section below). Curve construction options are
interpWhat (possible values are discount,
forward, and zero) and
interpHow (possible values are linear,
loglinear
, and spline). Both interpWhat and interpHow
are ignored when a flat yield curve is requested, but they must be
present nevertheless.
The pricing method can be one of the following (all short-rate models):
G2Analytic G2 2-factor Gaussian model using analytic formulas.
HWAnalytic Hull-White model using analytic formulas.
HWTree Hull-White model using a tree.
BKTree Black-Karasinski model using a tree.
ts
A term structure built with DiscounCurve or market observables
needed to construct the spot term
structure of interest rates. A list of name/value pairs. See the
help page for DiscountCurve for details.
swaptionMaturities
A vector containing the swaption maturities
associated with the rows of the swaption volatility matrix.
swapTenors
A vector containing the underlying swap tenors
associated with the columns of the swaption volatility matrix.
volMatrix
The swaption volatility matrix. Must be a 2D matrix
stored by rows. See the example below.
Details
This function was update for QuantLib Version 1.7.1 or later. It
introduces support for fixed-income instruments in RQuantLib. It implements the
full function and should work in most cases as long as there are suuficient swaption vol
data points to fit the affine model. At least 5 unique points are required. The data point
search attempts to find 5 or more points with one being the closet match in terms in of
expiration and maturity.
See the SabrSwaption function for an alternative.
Value
BermudanSwaption , if there are sufficient swaption vols to fit an affine model,
returns a list containing calibrated model
paramters (what parameters are returned depends on the model
selected) along with:
price
Price of swaption in basis points (actual price
equals price times notional divided by 10,000)
ATMStrike
At-the-money strike
params
Input parameter list
If there are insufficient swaption vols to calibrate it throws a warning and returns NULL
Author(s)
Dominick Samperi
References
Brigo, D. and Mercurio, F. (2001) Interest Rate Models: Theory and
Practice, Springer-Verlag, New York.
For information about QuantLib see https://www.quantlib.org/.
For information about RQuantLib see
http://dirk.eddelbuettel.com/code/rquantlib.html.
See Also
DiscountCurve, SabrSwaption
Examples
## Not run:
# This data replicates sample code shipped with QuantLib 0.3.10 results
params <- list(tradeDate=as.Date('2002-2-15'),
settleDate=as.Date('2002-2-19'),
startDate=as.Date('2003-2-19'),
maturity=as.Date('2008-2-19'),
dt=.25,
payFixed=TRUE,
strike=.05,
method="G2Analytic",
interpWhat="discount",
interpHow="loglinear")
setEvaluationDate(as.Date('2002-2-15'))
# Market data used to construct the term structure of interest rates
tsQuotes <- list(d1w =0.05,
# d1m =0.0372,
# fut1=96.2875,
# fut2=96.7875,
# fut3=96.9875,
# fut4=96.6875,
# fut5=96.4875,
# fut6=96.3875,
# fut7=96.2875,
# fut8=96.0875,
s3y =0.05,
s5y =0.05,
s10y =0.05,
s15y =0.05)
times=seq(0,14.75,.25)
swcurve=DiscountCurve(params,tsQuotes,times)
# Use this to compare with the Bermudan swaption example from QuantLib
#tsQuotes <- list(flat=0.04875825)
# Swaption volatility matrix with corresponding maturities and tenors
swaptionMaturities <- c(1,2,3,4,5)
swapTenors <- c(1,2,3,4,5)
volMatrix <- matrix(
c(0.1490, 0.1340, 0.1228, 0.1189, 0.1148,
0.1290, 0.1201, 0.1146, 0.1108, 0.1040,
0.1149, 0.1112, 0.1070, 0.1010, 0.0957,
0.1047, 0.1021, 0.0980, 0.0951, 0.1270,
0.1000, 0.0950, 0.0900, 0.1230, 0.1160),
ncol=5, byrow=TRUE)
volMatrix <- matrix(
c(rep(.20,25)),
ncol=5, byrow=TRUE)
# Price the Bermudan swaption
pricing <- BermudanSwaption(params, ts=.05,
swaptionMaturities, swapTenors, volMatrix)
summary(pricing)
## End(Not run)
eddelbuettel/rquantlib documentation built on March 27, 2024, 12:23 p.m.
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| BermudanSwaption | R Documentation |
Bermudan swaption valuation using several short-rate models
Description
BermudanSwaption prices a Bermudan swaption with specified
strike and maturity (in years), after calibrating the selected
short-rate model to an input swaption volatility matrix. Swaption
maturities are in years down the rows, and swap tenors are in years
along the columns, in the usual fashion. It is assumed that the
Bermudan swaption is
exercisable on each reset date of the underlying swaps.
Usage
BermudanSwaption(params, ts, swaptionMaturities, swapTenors,
volMatrix)
Arguments
params |
A list specifying the
| ||||||||
ts |
A term structure built with DiscounCurve or market observables
needed to construct the spot term
structure of interest rates. A list of name/value pairs. See the
help page for | ||||||||
swaptionMaturities |
A vector containing the swaption maturities associated with the rows of the swaption volatility matrix. | ||||||||
swapTenors |
A vector containing the underlying swap tenors associated with the columns of the swaption volatility matrix. | ||||||||
volMatrix |
The swaption volatility matrix. Must be a 2D matrix stored by rows. See the example below. |
Details
This function was update for QuantLib Version 1.7.1 or later. It
introduces support for fixed-income instruments in RQuantLib. It implements the
full function and should work in most cases as long as there are suuficient swaption vol
data points to fit the affine model. At least 5 unique points are required. The data point
search attempts to find 5 or more points with one being the closet match in terms in of
expiration and maturity.
See the SabrSwaption function for an alternative.
Value
BermudanSwaption , if there are sufficient swaption vols to fit an affine model,
returns a list containing calibrated model
paramters (what parameters are returned depends on the model
selected) along with:
price |
Price of swaption in basis points (actual price
equals |
ATMStrike |
At-the-money strike |
params |
Input parameter list |
If there are insufficient swaption vols to calibrate it throws a warning and returns NULL
Author(s)
Dominick Samperi
References
Brigo, D. and Mercurio, F. (2001) Interest Rate Models: Theory and Practice, Springer-Verlag, New York.
For information about QuantLib see https://www.quantlib.org/.
For information about RQuantLib see
http://dirk.eddelbuettel.com/code/rquantlib.html.
See Also
DiscountCurve, SabrSwaption
Examples
## Not run:
# This data replicates sample code shipped with QuantLib 0.3.10 results
params <- list(tradeDate=as.Date('2002-2-15'),
settleDate=as.Date('2002-2-19'),
startDate=as.Date('2003-2-19'),
maturity=as.Date('2008-2-19'),
dt=.25,
payFixed=TRUE,
strike=.05,
method="G2Analytic",
interpWhat="discount",
interpHow="loglinear")
setEvaluationDate(as.Date('2002-2-15'))
# Market data used to construct the term structure of interest rates
tsQuotes <- list(d1w =0.05,
# d1m =0.0372,
# fut1=96.2875,
# fut2=96.7875,
# fut3=96.9875,
# fut4=96.6875,
# fut5=96.4875,
# fut6=96.3875,
# fut7=96.2875,
# fut8=96.0875,
s3y =0.05,
s5y =0.05,
s10y =0.05,
s15y =0.05)
times=seq(0,14.75,.25)
swcurve=DiscountCurve(params,tsQuotes,times)
# Use this to compare with the Bermudan swaption example from QuantLib
#tsQuotes <- list(flat=0.04875825)
# Swaption volatility matrix with corresponding maturities and tenors
swaptionMaturities <- c(1,2,3,4,5)
swapTenors <- c(1,2,3,4,5)
volMatrix <- matrix(
c(0.1490, 0.1340, 0.1228, 0.1189, 0.1148,
0.1290, 0.1201, 0.1146, 0.1108, 0.1040,
0.1149, 0.1112, 0.1070, 0.1010, 0.0957,
0.1047, 0.1021, 0.0980, 0.0951, 0.1270,
0.1000, 0.0950, 0.0900, 0.1230, 0.1160),
ncol=5, byrow=TRUE)
volMatrix <- matrix(
c(rep(.20,25)),
ncol=5, byrow=TRUE)
# Price the Bermudan swaption
pricing <- BermudanSwaption(params, ts=.05,
swaptionMaturities, swapTenors, volMatrix)
summary(pricing)
## End(Not run)
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