version 1.5, 2013/03/26 05:53:57 |
version 1.9, 2014/03/31 06:20:06 |
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%% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm-package.Rd,v 1.4 2013/03/01 05:27:08 takayama Exp $ |
%% $OpenXM: OpenXM/src/R/r-packages/hgm/man/hgm-package.Rd,v 1.8 2014/03/31 00:49:51 takayama Exp $ |
\name{hgm-package} |
\name{hgm-package} |
\alias{hgm-package} |
\alias{hgm-package} |
\alias{HGM} |
\alias{HGM} |
Line 18 The holonomic gradient method (HGM, hgm) gives a way t |
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Line 18 The holonomic gradient method (HGM, hgm) gives a way t |
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\tabular{ll}{ |
\tabular{ll}{ |
Package: \tab hgm\cr |
Package: \tab hgm\cr |
Type: \tab Package\cr |
Type: \tab Package\cr |
Version: \tab 1.0\cr |
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Date: \tab 2013-02-07\cr |
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License: \tab GPL-2\cr |
License: \tab GPL-2\cr |
LazyLoad: \tab yes\cr |
LazyLoad: \tab yes\cr |
} |
} |
Line 29 of unnormalized probability distributions belongs to t |
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Line 27 of unnormalized probability distributions belongs to t |
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holonomic functions, which are solutions of holonomic systems of linear |
holonomic functions, which are solutions of holonomic systems of linear |
partial differential equations. |
partial differential equations. |
} |
} |
\author{ |
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\itemize{ |
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\item Nobuki Takayama (takayama@math.kobe-u.ac.jp) |
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} |
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} |
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\note{ |
\note{ |
This package includes a small subset of the Gnu scientific library codes |
This package includes a small subset of the Gnu scientific library codes |
(\url{http://www.gnu.org/software/gsl/}). |
(\url{http://www.gnu.org/software/gsl/}). |
Line 46 partial differential equations. |
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Line 39 partial differential equations. |
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\references{ |
\references{ |
\itemize{ |
\itemize{ |
\item Hiromasa Nakayama, Kenta Nishiyama, Masayuki Noro, Katsuyoshi Ohara, |
\item Hiromasa Nakayama, Kenta Nishiyama, Masayuki Noro, Katsuyoshi Ohara, |
Tomonari Sei, Nobuki Takayama, Akimichi Takemura, |
[N3OST2] Tomonari Sei, Nobuki Takayama, Akimichi Takemura, |
Holonomic Gradient Descent and its Application to Fisher-Bingham Integral, |
Holonomic Gradient Descent and its Application to Fisher-Bingham Integral, |
Advances in Applied Mathematics 47 (2011), 639--658, |
Advances in Applied Mathematics 47 (2011), 639--658, |
\url{http://dx.doi.org/10.1016/j.aam.2011.03.001} |
\url{http://dx.doi.org/10.1016/j.aam.2011.03.001} |
Line 60 Advances in Applied Mathematics 47 (2011), 639--658, |
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Line 53 Advances in Applied Mathematics 47 (2011), 639--658, |
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\keyword{ HGM } |
\keyword{ HGM } |
\keyword{ HGD } |
\keyword{ HGD } |
\seealso{ |
\seealso{ |
\code{\link{hgm.so3nc}} |
\code{\link{hgm.mleFBByOptim}} |
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\code{\link{hgm.ncBingham}} |
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\code{\link{hgm.ncorthant}} |
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\code{\link{hgm.ncso3}} |
\code{\link{hgm.pwishart}} |
\code{\link{hgm.pwishart}} |
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\code{\link{hgm.Rhgm}} |
} |
} |
\examples{ |
\examples{ |
\dontrun{ |
\dontrun{ |
example(hgm.so3nc) |
example(hgm.ncBingham) |
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example(hgm.ncorthant) |
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example(hgm.ncso3) |
example(hgm.pwishart) |
example(hgm.pwishart) |
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example(hgm.Rhgm) |
} |
} |
} |
} |