fastGHQuad-package: A package for fast, numerically-stable computation of...
In awblocker/fastGHQuad: Fast 'Rcpp' Implementation of Gauss-Hermite Quadrature
fastGHQuad-package R Documentation
A package for fast, numerically-stable computation of Gauss-Hermite
quadrature rules
Description
This package provides functions to compute Gauss-Hermite quadrature rules
very quickly with a higher degree of numerical stability (tested up to 2000
nodes).
Details
It also provides function for adaptive Gauss-Hermite quadrature, extending
Laplace approximations (as in Liu & Pierce 1994).
Package: fastGHQuad
Type: Package
License:
MIT
LazyLoad: yes
Author(s)
Alexander W Blocker
Maintainer: Alexander W Blocker <ablocker@gmail.com>
References
Golub, G. H. and Welsch, J. H. (1969). Calculation of Gauss
Quadrature Rules. Mathematics of Computation 23 (106): 221-230.
Liu, Q. and Pierce, D. A. (1994). A Note on Gauss-Hermite Quadrature.
Biometrika, 81(3) 624-629.
See Also
gaussHermiteData, aghQuad,
ghQuad
Examples
# Get quadrature rule
rule <- gaussHermiteData(1000)
# Find a normalizing constant
g <- function(x) 1/(1+x^2/10)^(11/2) # t distribution with 10 df
aghQuad(g, 0, 1.1, rule)
# actual is
1/dt(0,10)
# Find an expectation
g <- function(x) x^2*dt(x,10) # t distribution with 10 df
aghQuad(g, 0, 1.1, rule)
# actual is 1.25
awblocker/fastGHQuad documentation built on May 6, 2022, 5:49 a.m.
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| fastGHQuad-package | R Documentation |
A package for fast, numerically-stable computation of Gauss-Hermite quadrature rules
Description
This package provides functions to compute Gauss-Hermite quadrature rules very quickly with a higher degree of numerical stability (tested up to 2000 nodes).
Details
It also provides function for adaptive Gauss-Hermite quadrature, extending Laplace approximations (as in Liu & Pierce 1994).
| Package: | fastGHQuad |
| Type: | Package |
| License: | MIT |
| LazyLoad: | yes |
Author(s)
Alexander W Blocker
Maintainer: Alexander W Blocker <ablocker@gmail.com>
References
Golub, G. H. and Welsch, J. H. (1969). Calculation of Gauss Quadrature Rules. Mathematics of Computation 23 (106): 221-230.
Liu, Q. and Pierce, D. A. (1994). A Note on Gauss-Hermite Quadrature. Biometrika, 81(3) 624-629.
See Also
gaussHermiteData, aghQuad,
ghQuad
Examples
# Get quadrature rule rule <- gaussHermiteData(1000) # Find a normalizing constant g <- function(x) 1/(1+x^2/10)^(11/2) # t distribution with 10 df aghQuad(g, 0, 1.1, rule) # actual is 1/dt(0,10) # Find an expectation g <- function(x) x^2*dt(x,10) # t distribution with 10 df aghQuad(g, 0, 1.1, rule) # actual is 1.25
R Package Documentation
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We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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