<!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.0 Transitional//EN" "http://www.w3.org/TR/xhtml1/DTD/xhtml1-transitional.dtd"> <html xmlns="http://www.w3.org/1999/xhtml"> <head> <meta http-equiv="Content-Type" content="text/xhtml;charset=UTF-8"/> <title>linbox: Bibliography</title> <link href="tabs.css" rel="stylesheet" type="text/css"/> <link href="doxygen.css" rel="stylesheet" type="text/css"/> </head> <body> <!-- Generated by Doxygen 1.7.4 --> <script type="text/javascript"> function hasClass(ele,cls) { return ele.className.match(new RegExp('(\\s|^)'+cls+'(\\s|$)')); } function addClass(ele,cls) { if (!this.hasClass(ele,cls)) ele.className += " "+cls; } function removeClass(ele,cls) { if (hasClass(ele,cls)) { var reg = new RegExp('(\\s|^)'+cls+'(\\s|$)'); ele.className=ele.className.replace(reg,' '); } } function toggleVisibility(linkObj) { var base = linkObj.getAttribute('id'); var summary = document.getElementById(base + '-summary'); var content = document.getElementById(base + '-content'); var trigger = document.getElementById(base + '-trigger'); if ( hasClass(linkObj,'closed') ) { summary.style.display = 'none'; content.style.display = 'block'; trigger.src = 'open.png'; removeClass(linkObj,'closed'); addClass(linkObj,'opened'); } else if ( hasClass(linkObj,'opened') ) { summary.style.display = 'block'; content.style.display = 'none'; trigger.src = 'closed.png'; removeClass(linkObj,'opened'); addClass(linkObj,'closed'); } return false; } </script> <div id="top"> <div id="titlearea"> <table cellspacing="0" cellpadding="0"> <tbody> <tr style="height: 56px;"> <td style="padding-left: 0.5em;"> <div id="projectname">linbox</div> </td> </tr> </tbody> </table> </div> <div id="navrow1" class="tabs"> <ul class="tablist"> <li><a href="index.html"><span>Main Page</span></a></li> <li class="current"><a href="pages.html"><span>Related Pages</span></a></li> <li><a href="modules.html"><span>Modules</span></a></li> <li><a href="namespaces.html"><span>Namespaces</span></a></li> <li><a href="annotated.html"><span>Data Structures</span></a></li> <li><a href="files.html"><span>Files</span></a></li> <li><a href="dirs.html"><span>Directories</span></a></li> <li><a href="examples.html"><span>Examples</span></a></li> </ul> </div> </div> <div class="header"> <div class="headertitle"> <div class="title">Bibliography </div> </div> </div> <div class="contents"> <div class="textblock"><p><a class="anchor" id="_bib000001"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_block_lanczos_solver.html">BlockLanczosSolver< Field, Matrix ></a> </dt> <dd>[Montgomery '95] </dd> </dl> <p><a class="anchor" id="_bib000002"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_block_massey_domain.html">BlockMasseyDomain< _Field, _Sequence ></a> </dt> <dd>Giorgi, Jeannerod Villard algorithm from ISSAC'03 </dd> </dl> <p><a class="anchor" id="_bib000004"></a> </p> <dl> <dt>Class <a class="el" href="struct_lin_box_1_1_full_multip_c_r_a.html">FullMultipCRA< Domain_Type ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000007"></a> </p> <dl> <dt>Global <a class="el" href="class_lin_box_1_1_gauss_domain.html#a10e9e1d9eed55ae330cc605fc871dedc">GaussDomain< _Field >::QLUPin</a> (unsigned long &rank, Element &determinant, Perm &Q, Matrix &L, Matrix &U, Perm &P, unsigned long Ni, unsigned long Nj) const </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000005"></a> </p> <dl> <dt>Class <a class="el" href="struct_lin_box_1_1_givaro_rns_fixed_c_r_a.html">GivaroRnsFixedCRA< Domain_Type ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000003"></a> </p> <dl> <dt>Global <a class="el" href="group__algorithms.html#ga1ef0e9d69b30d9e2db5e3c52a6bf0839">LinBox::cia</a> (Polynomial &P, const Blackbox &A, const Method::BlasElimination &M) </dt> <dd>[Dumas-Pernet-Wan ISSAC05]</dd> </dl> <p><a class="anchor" id="_bib000008"></a> </p> <dl> <dt>Group <a class="el" href="group__padic.html">padic</a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000017"></a> </p> <dl> <dt>Global <a class="el" href="class_lin_box_1_1_p_i_d__integer.html#a520ae1ba12c83b341f039f23655c5f2a">PID_integer::RationalReconstruction</a> (Element &a, Element &b, const Element &f, const Element &m, const Element &k, bool reduce, bool recursive) const </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000013"></a> </p> <dl> <dt>File <a class="el" href="rational-solver2_8h.html">rational-solver2.h</a> </dt> <dd>Implementation of the algorithm in manuscript, available at <a href="http://www.cis.udel.edu/~wan/jsc_wan.ps">http://www.cis.udel.edu/~wan/jsc_wan.ps</a> </dd> </dl> <p><a class="anchor" id="_bib000010"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_rational_solver_3_01_ring_00_01_field_00_01_random_prime_00_01_block_wiedemann_traits_01_4.html">RationalSolver< Ring, Field, RandomPrime, BlockWiedemannTraits ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000011"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_rational_solver_3_01_ring_00_01_field_00_01_random_prime_00_01_dixon_traits_01_4.html">RationalSolver< Ring, Field, RandomPrime, DixonTraits ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000014"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_rational_solver_3_01_ring_00_01_field_00_01_random_prime_00_01_wan_traits_01_4.html">RationalSolver< Ring, Field, RandomPrime, WanTraits ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000009"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_rational_solver_3_01_ring_00_01_field_00_01_random_prime_00_01_wiedemann_traits_01_4.html">RationalSolver< Ring, Field, RandomPrime, WiedemannTraits ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000015"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_sigma_basis.html">SigmaBasis< _Field ></a> </dt> <dd></dd> </dl> <p><a class="anchor" id="_bib000016"></a> </p> <dl> <dt>Class <a class="el" href="class_lin_box_1_1_smith_form_iliopoulos.html">SmithFormIliopoulos</a> </dt> <dd><em>Worst Case Complexity Bounds on Algorithms for computing the Canonical Structure of Finite Abelian Groups and the Hermite and Smith Normal Forms of an Integer Matrix</em>, by Costas Iliopoulos. </dd> </dl> </div></div> <hr class="footer"/><address class="footer"><small>Generated on Tue Aug 30 2011 for linbox by  <a href="http://www.doxygen.org/index.html"> <img class="footer" src="doxygen.png" alt="doxygen"/></a> 1.7.4 </small></address> </body> </html>