| version 1.16, 2016/02/07 07:23:21 |
version 1.33, 2021/12/13 04:40:21 |
|
|
| <html> |
<html> |
| <head> |
<head> |
| <meta http-equiv="Content-Type" content="text/html; charset=UTF-8"> |
<meta http-equiv="Content-Type" content="text/html; charset=UTF-8"> |
| |
<meta name="viewport" content="width=device-width,initial-scale=1.0,minimum-scale=1.0"> |
| |
<!-- for mobile friendly --> |
| <title>References for HGM</title> <!-- Use UTF-8 文字 code--> |
<title>References for HGM</title> <!-- Use UTF-8 文字 code--> |
| <!-- Do not edit this file. Edit it under OpenXM/src/hgm/doc --> |
<!-- Do not edit this file. Edit it under OpenXM/src/hgm/doc --> |
| </head> |
</head> |
| Line 12 the Holonomic Gradient Descent Method (HGD) </h1> |
|
| Line 14 the Holonomic Gradient Descent Method (HGD) </h1> |
|
| |
|
| <h2> Papers and Tutorials</h2> |
<h2> Papers and Tutorials</h2> |
| <ol> |
<ol> |
| |
<li> Nobuki Takayama, Takaharu Yaguchi, Yi Zhang, |
| |
Comparison of Numerical Solvers for Differential Equations for Holonomic Gradient Method in Statistics, |
| |
<a href="https://arxiv.org/abs/2111.10947"> arxiv:2111.10947 </a> |
| |
|
| |
<li> Shuhei Mano, Nobuki Takayama, |
| |
Algebraic algorithm for direct sampling from toric models, |
| |
<a href="https://arxiv.org/abs/2110.14992"> arxiv:2110.14992 </a> |
| |
|
| |
<li> M.Adamer, A.Lorincz, A.L.Sattelberger, B.Sturmfels, Algebraic Analysis of Rotation Data |
| |
<a href="https://arxiv.org/abs/1912.00396"> arxiv: 1912.00396 </a> |
| |
<li> |
| |
Anna-Laura Sattelberger, Bernd Sturmfels, |
| |
D-Modules and Holonomic Functions |
| |
<a href="https://arxiv.org/abs/1910.01395"> arxiv:1910.01395 </a> |
| |
<li> |
| |
N.Takayama, L.Jiu, S.Kuriki, Y.Zhang, |
| |
Computations of the Expected Euler Characteristic for the Largest Eigenvalue of a Real Wishart Matrix, |
| |
<!-- |
| |
<a href="https://arxiv.org/abs/1903.10099"> arxiv:1903.10099 </a> --> |
| |
<a href="https://doi.org/10.1016/j.jmva.2020.104642"> jmva </a> |
| |
<li> M.Harkonen, T.Sei, Y.Hirose, |
| |
Holonomic extended least angle regression, |
| |
<a href="https://arxiv.org/abs/1809.08190"> arxiv:1809.08190 </a> |
| |
<li> S.Mano, |
| |
Partitions, Hypergeometric Systems, and Dirichlet Processes in Statistics, |
| |
<a href="https://www.springer.com/jp/book/9784431558866"> |
| |
JSS Research Series in Statistics</a>, 2018. |
| |
<li> A.Kume, T.Sei, |
| |
On the exact maximum likelihood inference of Fisher–Bingham distributions using an adjusted holonomic gradient method, |
| |
<a href="https://doi.org/10.1007/s11222-017-9765-3"> doi </a> (2018) |
| |
<li> Yoshihito Tachibana, Yoshiaki Goto, Tamio Koyama, Nobuki Takayama, |
| |
Holonomic Gradient Method for Two Way Contingency Tables, |
| |
<a href="https://arxiv.org/abs/1803.04170"> arxiv:1803.04170 </a> |
| |
<li> F.H.Danufane, K.Ohara, N.Takayama, C.Siriteanu, |
| |
Holonomic Gradient Method-Based CDF Evaluation for the Largest Eigenvalue of a Complex Noncentral Wishart Matrix |
| |
(Title of the version 1: Holonomic Gradient Method for the Distribution Function of the Largest Root of Complex Non-central Wishart Matrices), |
| |
<a href="https://arxiv.org/abs/1707.02564"> arxiv:1707.02564 </a> |
| |
<li> T.Koyama, |
| |
An integral formula for the powered sum of the independent, identically and normally distributed random variables, |
| |
<a href="https://arxiv.org/abs/1706.03989"> arxiv:1706.03989 </a> |
| |
<li> H.Hashiguchi, N.Takayama, A.Takemura, |
| |
Distribution of Ratio of two Wishart Matrices and Evaluation of Cumulative Probability |
| |
by Holonomic Gradient Method, |
| |
<a href="https://arxiv.org/abs/1610.09187"> arxiv:1610.09187 </a> |
| |
|
| |
<li> R.Vidunas, A.Takemura, |
| |
Differential relations for the largest root distribution |
| |
of complex non-central Wishart matrices, |
| |
<a href="http://arxiv.org/abs/1609.01799"> arxiv:1609.01799 </a> |
| |
|
| |
<li> S.Mano, |
| |
The A-hypergeometric System Associated with the Rational Normal Curve and |
| |
Exchangeable Structures, |
| |
<a href="http://arxiv.org/abs/1607.03569"> arxiv:1607.03569 </a> |
| |
|
| |
<li> M.Noro, |
| |
System of Partial Differential Equations for the Hypergeometric Function 1F1 of a Matrix Argument on Diagonal Regions, |
| |
<a href="http://dl.acm.org/citation.cfm?doid=2930889.2930905"> ACM DL </a> |
| |
|
| <li> Y.Goto, K.Matsumoto, |
<li> Y.Goto, K.Matsumoto, |
| Pfaffian equations and contiguity relations of the hypergeometric function of type (k+1,k+n+2) and their applications, |
Pfaffian equations and contiguity relations of the hypergeometric function of type (k+1,k+n+2) and their applications, |
| <a href="http://arxiv.org/abs/1602.01637"> arxiv:1602.01637 </a> |
<a href="http://arxiv.org/abs/1602.01637"> arxiv:1602.01637 </a> |
|
|
| with a multivariate normal distribution, |
with a multivariate normal distribution, |
| <a href="http://arxiv.org/abs/1512.06564"> arxiv:1512.06564 </a> |
<a href="http://arxiv.org/abs/1512.06564"> arxiv:1512.06564 </a> |
| |
|
| |
<li> N.Takayama, Holonomic Gradient Method (in Japanese, survey), |
| |
<a href="http://www.math.kobe-u.ac.jp/HOME/taka/2015/hgm-dic.pdf"> |
| |
hgm-dic.pdf </a> |
| |
|
| <li> N.Takayama, S.Kuriki, A.Takemura, |
<li> N.Takayama, S.Kuriki, A.Takemura, |
| A-Hpergeometric Distributions and Newton Polytopes, |
A-Hpergeometric Distributions and Newton Polytopes, |
| Line 31 A-Hpergeometric Distributions and Newton Polytopes, |
|
| Line 95 A-Hpergeometric Distributions and Newton Polytopes, |
|
| Normalizing Kernels in the Billera-Holmes-Vogtmann Treespace, |
Normalizing Kernels in the Billera-Holmes-Vogtmann Treespace, |
| <a href="http://arxiv.org/abs/1506.00142"> arxiv:1506.00142 </a> |
<a href="http://arxiv.org/abs/1506.00142"> arxiv:1506.00142 </a> |
| |
|
| |
<li> C.Siriteanu, A.Takemura, C.Koutschan, S.Kuriki, D.St.P.Richards, H.Sin, |
| |
Exact ZF Analysis and Computer-Algebra-Aided Evaluation |
| |
in Rank-1 LoS Rician Fading, |
| |
<a href="http://arxiv.org/abs/1507.07056"> arxiv:1507.07056 </a> |
| |
|
| <li> K.Ohara, N.Takayama, |
<li> K.Ohara, N.Takayama, |
| Pfaffian Systems of A-Hypergeometric Systems II --- |
Pfaffian Systems of A-Hypergeometric Systems II --- |
| Holonomic Gradient Method, |
Holonomic Gradient Method, |
| Line 81 Holonomic Modules Associated with Multivariate Normal |
|
| Line 150 Holonomic Modules Associated with Multivariate Normal |
|
| Pfaffian Systems of A-Hypergeometric Equations I, |
Pfaffian Systems of A-Hypergeometric Equations I, |
| Bases of Twisted Cohomology Groups, |
Bases of Twisted Cohomology Groups, |
| <a href="http://arxiv.org/abs/1212.6103"> arxiv:1212.6103 </a> |
<a href="http://arxiv.org/abs/1212.6103"> arxiv:1212.6103 </a> |
| (major revision v2 of arxiv:1212.6103) |
(major revision v2 of arxiv:1212.6103). |
| |
Accepted version is at |
| |
<a href="http://dx.doi.org/10.1016/j.aim.2016.10.021"> DOI </a> |
| |
|
| <li> <img src="./wakaba01.png" alt="Intro"> |
<li> <img src="./wakaba01.png" alt="Intro"> |
| <a href="http://link.springer.com/book/10.1007/978-4-431-54574-3"> |
<a href="http://link.springer.com/book/10.1007/978-4-431-54574-3"> |
| Line 215 maximal Likehood estimates for the Fisher-Bingham dist |
|
| Line 286 maximal Likehood estimates for the Fisher-Bingham dist |
|
| <li> <a href="http://www.math.kobe-u.ac.jp/OpenXM/Math/Fisher-Bingham-2"> d-dimensional Fisher-Bingham System </a> |
<li> <a href="http://www.math.kobe-u.ac.jp/OpenXM/Math/Fisher-Bingham-2"> d-dimensional Fisher-Bingham System </a> |
| </ol> |
</ol> |
| |
|
| <pre> $OpenXM: OpenXM/src/hgm/doc/ref-hgm.html,v 1.15 2016/02/07 06:53:00 takayama Exp $ </pre> |
<pre> $OpenXM: OpenXM/src/hgm/doc/ref-hgm.html,v 1.32 2020/08/24 23:24:27 takayama Exp $ </pre> |
| </body> |
</body> |
| </html> |
</html> |
![[BACK]](/icons/cvsweb/back.gif){kind=icon}
Return to ref-hgm.html CVS log ![[TXT]](/icons/cvsweb/text.gif){kind=icon}
![[DIR]](/icons/cvsweb/dir.gif){kind=icon}
Up to [local] / OpenXM / src / hgm / doc