<?xml version="1.0" encoding="utf-8" ?> <!-- for emacs: -*- coding: utf-8 -*- --> <!-- Apache may like this line in the file .htaccess: AddCharset utf-8 .html --> <!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.1 plus MathML 2.0 plus SVG 1.1//EN" "http://www.w3.org/2002/04/xhtml-math-svg/xhtml-math-svg-flat.dtd" > <html xmlns="http://www.w3.org/1999/xhtml" xml:lang="en"> <head><title>localCohom(List,Ideal,Module) -- local cohomology of a D-module</title> <link rel="stylesheet" type="text/css" href="../../../../Macaulay2/Style/doc.css"/> </head> <body> <table class="buttons"> <tr> <td><div><a href="_local__Cohom_lp__Z__Z_cm__Ideal_rp.html">next</a> | <a href="_local__Cohom_lp__List_cm__Ideal_rp.html">previous</a> | <a href="_local__Cohom_lp__Z__Z_cm__Ideal_rp.html">forward</a> | <a href="_local__Cohom_lp__List_cm__Ideal_rp.html">backward</a> | up | <a href="index.html">top</a> | <a href="master.html">index</a> | <a href="toc.html">toc</a> | <a href="http://www.math.uiuc.edu/Macaulay2/">Macaulay2 web site</a></div> </td> </tr> </table> <hr/> <div><h1>localCohom(List,Ideal,Module) -- local cohomology of a D-module</h1> <div class="single"><h2>Synopsis</h2> <ul><li><div class="list"><dl class="element"><dt class="heading">Usage: </dt><dd class="value"><div><tt>localCohom(l,I,M)</tt></div> </dd></dl> </div> </li> <li><span>Function: <a href="_local__Cohom.html" title="local cohomology">localCohom</a></span></li> <li><div class="single">Inputs:<ul><li><span><tt>l</tt>, <span>a <a href="../../Macaulay2Doc/html/___List.html">list</a></span></span></li> <li><span><tt>I</tt>, <span>an <a href="../../Macaulay2Doc/html/___Ideal.html">ideal</a></span></span></li> <li><span><tt>M</tt>, <span>a <a href="../../Macaulay2Doc/html/___Module.html">module</a></span></span></li> </ul> </div> </li> <li><div class="single">Outputs:<ul><li><span><span>a <a href="../../Macaulay2Doc/html/___Hash__Table.html">hash table</a></span>, the local cohomology <em>H<sub>I</sub>(M)</em> in degrees listed in <em>l</em>, where <em>I</em> is an ideal in a polynomial ring and <em>M</em> is a D-module</span></li> </ul> </div> </li> <li><div class="single"><a href="../../Macaulay2Doc/html/_using_spfunctions_spwith_spoptional_spinputs.html">Optional inputs</a>:<ul><li><span><a href="_local__Cohom_lp..._cm_sp__Loc__Strategy_sp_eq_gt_sp..._rp.html">LocStrategy => ...</a>, -- specify localization strategy for local cohomology</span></li> <li><span><a href="_local__Cohom_lp..._cm_sp__Strategy_sp_eq_gt_sp..._rp.html">Strategy => ...</a>, -- specify strategy for local cohomology</span></li> </ul> </div> </li> </ul> </div> <div class="single"><h2>Description</h2> <div>See <a href="_local__Cohom_lp__Ideal_cm__Module_rp.html" title="local cohomology of a D-module">localCohom(Ideal,Module)</a> for the full description.<table class="examples"><tr><td><pre>i1 : W = QQ[X, dX, Y, dY, Z, dZ, WeylAlgebra=>{X=>dX, Y=>dY, Z=>dZ}] o1 = W o1 : PolynomialRing</pre> </td></tr> <tr><td><pre>i2 : I = ideal (X*(Y-Z), X*Y*Z) o2 = ideal (X*Y - X*Z, X*Y*Z) o2 : Ideal of W</pre> </td></tr> <tr><td><pre>i3 : h = localCohom({1,2}, I, W^1 / ideal{dX,dY,dZ}) WARNING! Dlocalization is an obsolete name for Dlocalize WARNING! Dlocalization is an obsolete name for Dlocalize WARNING! Dlocalization is an obsolete name for Dlocalize o3 = HashTable{1 => subquotient (| 0 0 -dY-dZ 0 0 0 0 0 dXdY+dXdZ 0 0 -dYdZ-dZ^2 0 0 4Y2-8YZ+4Z2 -3XdX-6YdZ+6ZdZ+6 -XdX+4YdY-6dYZ+4YdZ-6ZdZ-2 XdX+2 XdX+4YdZ-4ZdZ-6 0 0 XdXdZ+2dZ 0 3dXdYdZ+3dXdZ^2 0 0 -4dXY2+8dXYZ-4dXZ2 -2XdXY+3XdXZ-4Y+6Z -XdX^2-3dX -XdX^2-6dXYdZ+6dXZdZ+9dX 3XdX^2+9dXYdZ-9dXZdZ-9dX XdX^2-6dXYdY+9dXdYZ-6dXYdZ+9dXZdZ+3dX -dX^2dY-dX^2dZ -4dX^2YdZ+4dX^2ZdZ+8dX^2 2dX^2YdZ-2dX^2ZdZ-4dX^2 -XdX^2dZ-3dXdZ -dX^2dYdZ-dX^2dZ^2 2dX^2YdY-3dX^2dYZ+2dX^2YdZ-3dX^2ZdZ 4dX^2Y2-8dX^2YZ+4dX^2Z2 2XdX^2Y-3XdX^2Z+6dXY-9dXZ |, | X2Y2-2X2YZ+X2Z2 dY+dZ YdZ-ZdZ-2 XdX+2 0 0 0 |)} | -XdX-2 -XdX+YdY -Z2dZ-2Z -dYZdZ-2dY XdXdZ-YdYdZ -XdXdY-2dY XdX^2+3dX 2XdX^2-3dXYdY dXZ2dZ+2dXZ dXdYZdZ+2dXdY dX^2ZdZ+2dX^2 -XdXZdZ+YdYZdZ-dYZ2dZ-Z2dZ^2-2dYZ-4ZdZ-2 XdXdYdZ+2dYdZ -2XdX^2dZ+3dXYdYdZ 4Y2Z2 -XdXZ2-6YZ2dZ-2Z3dZ-12YZ-6Z2 -XdXZ2+4YdYZ2+4YZ2dZ+2Z3dZ+8YZ+10Z2 XdXZ2+2Z2 XdXZ2+4YZ2dZ+4Z3dZ+8YZ+10Z2 dX^2YdY+2dX^2 XdX^2dY+3dXdY XdXZ2dZ+2XdXZ+2Z2dZ+4Z -dX^2dYZdZ-2dX^2dY 2XdX^2ZdZ-3dXYdYZdZ+3dXdYZ2dZ+3dXZ2dZ^2+6dXdYZ+12dXZdZ+6dX -dX^2YdYdZ-2dX^2dZ -XdX^2dYdZ-3dXdYdZ -4dXY2Z2 -2XdXYZ2-XdXZ3-4YZ2-2Z3 -XdX^2Z2-3dXZ2 -XdX^2Z2-6dXYZ2dZ-6dXZ3dZ-12dXYZ-15dXZ2 XdX^2Z2+9dXYZ2dZ+3dXZ3dZ+18dXYZ+9dXZ2 XdX^2Z2-6dXYdYZ2-6dXYZ2dZ-3dXZ3dZ-12dXYZ-15dXZ2 -2dX^2YdYZ-dX^2Z2dZ-6dX^2Z -4dX^2YZ2dZ-8dX^2YZ 2dX^2YZ2dZ+2dX^2Z3dZ+4dX^2YZ+4dX^2Z2 -XdX^2Z2dZ-2XdX^2Z-3dXZ2dZ-6dXZ dX^2YdYZdZ-dX^2dYZ2dZ-dX^2Z2dZ^2-2dX^2dYZ-2dX^2ZdZ-2dX^2 2dX^2YdYZ2+2dX^2YZ2dZ+dX^2Z3dZ+4dX^2YZ+6dX^2Z2 4dX^2Y2Z2 2XdX^2YZ2+XdX^2Z3+6dXYZ2+3dXZ3 | | X2Y2Z2 0 0 0 ZdZ+2 YdY+2 XdX+2 | 2 => cokernel | -X2Y2Z2 X2Y2-2X2YZ+X2Z2 YdY+ZdZ+6 XdX+4 YZdZ-Z2dZ+2Y-4Z dYZ2dZ+Z2dZ^2+4dYZ+8ZdZ+10 | o3 : HashTable</pre> </td></tr> <tr><td><pre>i4 : pruneLocalCohom h o4 = HashTable{1 => | dZ dY XdX+3 X3 | } 2 => | dYZ+YdZ+2 YdY+ZdZ+6 Y2-2YZ+Z2 XdX+4 YZdZ-Z2dZ+2Y-4Z 2YZ3-Z4 Z4dZ+2YZ2+4Z3 Z5 | o4 : HashTable</pre> </td></tr> </table> </div> </div> <div class="single"><h2>See also</h2> <ul><li><span><a href="_prune__Local__Cohom_lp__Hash__Table_rp.html" title="prunes local cohomology modules">pruneLocalCohom</a> -- prunes local cohomology modules</span></li> </ul> </div> </div> </body> </html>