| version 1.1, 2001/06/19 07:32:58 |
version 1.2, 2001/06/20 01:54:05 |
|
|
| % $OpenXM$ |
% $OpenXM: OpenXM/doc/ascm2001p/heterotic-network.tex,v 1.1 2001/06/19 07:32:58 noro Exp $ |
| \section{Applications} |
\section{Applications} |
| |
|
| \subsection{Heterogeneous Servers} |
\subsection{Heterogeneous Servers} |
| Line 12 depend each servers, |
|
| Line 12 depend each servers, |
|
| it is relatively easy to install new servers. |
it is relatively easy to install new servers. |
| We can build a new computer math system by assembling |
We can build a new computer math system by assembling |
| different OpenXM servers. |
different OpenXM servers. |
| It is similar to building a toy house by LEGO blocks. |
OpenXM servers currently provide 1077 functions |
| |
\cite{openxm-1077}. |
| |
We can use these as building blocks for a new system. |
| |
|
| We will see two examples of custom-made systems |
We present an example of a custom-made system |
| built by OpenXM servers. |
built by OpenXM servers. |
| |
|
| \subsubsection{Computation of annihilating ideals by kan/sm1 and ox\_asir} |
%\subsubsection{Computation of annihilating ideals by kan/sm1 and ox\_asir} |
| |
% |
| |
%Let $D = {\bf Q} \langle x_1, \ldots, x_n , \pd{1}, \ldots, \pd{n} \rangle$ |
| |
%be the ring of differential operators. |
| |
%For a given polynomial |
| |
%$ f \in {\bf Q}[x_1, \ldots, x_n] $, |
| |
%the annihilating ideal of $f^{-1}$ is defined as |
| |
%$$ {\rm Ann}\, f^{-1} = \{ \ell \in D \,|\, |
| |
% \ell \bullet f^{-1} = 0 \}. |
| |
%$$ |
| |
%Here, $\bullet$ denotes the action of $D$ to functions. |
| |
%The annihilating ideal can be regarded as the maximal differential |
| |
%equations for the function $f^{-1}$. |
| |
%An algorithm to determine generators of the annihilating ideal |
| |
%was given by Oaku (see, e.g., \cite[5.3]{sst-book}). |
| |
%His algorithm reduces the problem to computations of Gr\"obner bases |
| |
%in $D$ and to find the minimal integral root of a polynomial. |
| |
%This algorithm (the function {\tt annfs}) is implemented by |
| |
%kan/sm1 \cite{kan}, for Gr\"obner basis computation in $D$, and |
| |
%{\tt ox\_asir}, to factorize polynomials to find the integral |
| |
%roots. |
| |
%These two OpenXM compliant systems are integrated by |
| |
%the OpenXM protocol. |
| |
|
| Let $D = {\bf Q} \langle x_1, \ldots, x_n , \pd{1}, \ldots, \pd{n} \rangle$ |
|
| be the ring of differential operators. |
|
| For a given polynomial |
|
| $ f \in {\bf Q}[x_1, \ldots, x_n] $, |
|
| the annihilating ideal of $f^{-1}$ is defined as |
|
| $$ {\rm Ann}\, f^{-1} = \{ \ell \in D \,|\, |
|
| \ell \bullet f^{-1} = 0 \}. |
|
| $$ |
|
| Here, $\bullet$ denotes the action of $D$ to functions. |
|
| The annihilating ideal can be regarded as the maximal differential |
|
| equations for the function $f^{-1}$. |
|
| An algorithm to determine generators of the annihilating ideal |
|
| was given by Oaku (see, e.g., \cite[5.3]{sst-book}). |
|
| His algorithm reduces the problem to computations of Gr\"obner bases |
|
| in $D$ and to find the minimal integral root of a polynomial. |
|
| This algorithm (the function {\tt annfs}) is implemented by |
|
| kan/sm1 \cite{kan}, for Gr\"obner basis computation in $D$, and |
|
| {\tt ox\_asir}, to factorize polynomials to find the integral |
|
| roots. |
|
| These two OpenXM compliant systems are integrated by |
|
| the OpenXM protocol. |
|
| |
|
| %For example, the following is a sm1 session to find the annihilating |
%For example, the following is a sm1 session to find the annihilating |
| %ideal for $f = x^3 - y^2 z^2$. |
%ideal for $f = x^3 - y^2 z^2$. |
| %\begin{verbatim} |
%\begin{verbatim} |
| Line 116 these algorithms. |
|
| Line 118 these algorithms. |
|
| What we need for the implementation are mainly |
What we need for the implementation are mainly |
| (1) Gr\"obner basis computation both in the ring of polynomials |
(1) Gr\"obner basis computation both in the ring of polynomials |
| and in the ring of differential operators, |
and in the ring of differential operators, |
| |
(2) enumeration of all the Gr\"obner bases of toric ideals, |
| |
and |
| |
(3) primary ideal decomposition. |
| |
Asir and kan/sm1 provide functions for (1), |
| |
{\tt TiGERS} provides a function for (2), |
| and |
and |
| (2) enumeration of all the Gr\"obner bases of toric ideals. |
Asir provides a function for (3). |
| Asir and kan/sm1 provide functions for (1) and |
These software systems communicate each other by OpenXM-RFC 100 protocol |
| {\tt TiGERS} provides a function for (2). |
and form a unified package for GKZ hypergeometric systems. |
| These components communicate each other by OpenXM-RFC 100 protocol. |
See the chapter of dsolv of Asir Contrib User's manual \cite{openxm-web} |
| |
|
| %Let us see an example how to construct series solution of a GKZ hypergeometric |
%Let us see an example how to construct series solution of a GKZ hypergeometric |
| %system. |
%system. |
![[BACK]](/icons/cvsweb/back.gif){kind=icon}
Return to heterotic-network.tex CVS log ![[TXT]](/icons/cvsweb/text.gif){kind=icon}
![[DIR]](/icons/cvsweb/dir.gif){kind=icon}
Up to [local] / OpenXM / doc / ascm2001p