<?xml version="1.0" encoding="ISO-8859-1"?>

<!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.0 Strict//EN"
         "http://www.w3.org/TR/xhtml1/DTD/xhtml1-strict.dtd">

<html xmlns="http://www.w3.org/1999/xhtml" xml:lang="en">
<head>
<title>GAP (LAGUNA) - References</title>
<meta http-equiv="content-type" content="text/html; charset=iso-8859-1" />
<meta name="generator" content="GAPDoc2HTML" />
<link rel="stylesheet" type="text/css" href="manual.css" />
</head>
<body>


<div class="pcenter"><table class="chlink"><tr><td class="chlink1">Goto Chapter: </td><td><a href="chap0.html">Top</a></td><td><a href="chap1.html">1</a></td><td><a href="chap2.html">2</a></td><td><a href="chap3.html">3</a></td><td><a href="chap4.html">4</a></td><td><a href="chapBib.html">Bib</a></td><td><a href="chapInd.html">Ind</a></td></tr></table><br /></div>
<p><a id="s0ss0" name="s0ss0"></a></p>

<h3>References</h3>


<p><a id="biBCS" name="biBCS"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR2262389">CS</a>]   <b>Catino, F. and Spinelli, E. </b> <i>Lie nilpotent group algebras and upper Lie codimension
              subgroups</i>,
 Comm. Algebra,
 <em>34</em> (10),
 (2006),
 p. 3859--3873</p>


<p><a id="biBDu" name="biBDu"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1165165">Du</a>]   <b>Du, X. K. </b> <i>The centers of a radical ring</i>,
 Canad. Math. Bull.,
 <em>35</em> (2),
 (1992),
 p. 174-179</p>


<p><a id="biBHB" name="biBHB"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR650245 ">HB</a>]   <b>Huppert, B. and Blackburn, N. </b> <i>Finite groups. II</i>,
 Springer-Verlag,
 Grundlehren der Mathematischen Wissenschaften [Fundamental
              Principles of Mathematical Sciences],
 <em>242</em>,
 Berlin,
 (1982),
 p. xiii+531<br />
(,
              AMD, 44)<br />
</p>


<p><a id="biBLR86" name="biBLR86"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR860058 ">LR86</a>]   <b>Levin, F. and Rosenberger, G. </b> <i>Lie metabelian group rings</i> in ,
 <i>Group and semigroup rings (Johannesburg, 1985)</i>,
 North-Holland,
 North-Holland Math. Stud.,
 <em>126</em>,
 Amsterdam,
 (1986),
 p. 153--161</p>


<p><a id="biBPPS73" name="biBPPS73"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR0325746">PPS73</a>]   <b>Passi, I. B. S. and Passman, D. S. and Sehgal, S. K. </b> <i>Lie solvable group rings</i>,
 Canad. J. Math.,
 <em>25</em>,
 (1973),
 p. 748--757</p>


<p><a id="biBRos97" name="biBRos97"></a></p>
<p>
[<span style="color: #8e0000;">Ros97</span>]   <b>Rossmanith, R. </b> <i>Centre-by-metabelian group algebras</i>,
 Friedrich-Schiller-Universit\accent127at Jena,
 (1997)</p>


<p><a id="biBRos00" name="biBRos00"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1749673">Ros00</a>]   <b>Rossmanith, R. </b> <i>Lie centre-by-metabelian group algebras in even
              characteristic. I, II</i>,
 Israel J. Math.,
 <em>115</em>,
 (2000),
 p. 51--75, 77--99</p>


<p><a id="biBRoss" name="biBRoss"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1917380">Ross</a>]   <b>Rossmanith, R. </b> <i>Lie centre-by-metabelian group algebras over commutative
              rings</i>,
 J. Algebra,
 <em>251</em> (2),
 (2002),
 p. 503--508</p>


<p><a id="biBShalev91" name="biBShalev91"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1099083">Shalev91</a>]   <b>Shalev, A. </b> <i>Lie dimension subgroups, Lie nilpotency indices, and the
              exponent of the group of normalized units</i>,
 J. London Math. Soc. (2),
 <em>43</em> (1),
 (1991),
 p. 23--36</p>


<p><a id="biBSims" name="biBSims"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1267733">Sims</a>]   <b>Sims, C. C. </b> <i>Computation with finitely presented groups</i>,
 Cambridge University Press,
 Encyclopedia of Mathematics and its Applications,
 <em>48</em>,
 Cambridge,
 (1994),
 p. xiii+604</p>


<p><a id="biBWursthorn" name="biBWursthorn"></a></p>
<p>
[<a href="http://www.ams.org/mathscinet-getitem?mr=MR1218760">Wursthorn</a>]   <b>Wursthorn, M. </b> <i>Isomorphisms of modular group algebras: an algorithm and its
              application to groups of order $2\sp 6$</i>,
 J. Symbolic Comput.,
 <em>15</em> (2),
 (1993),
 p. 211--227</p>

<p> </p>


<div class="pcenter">
<table class="chlink"><tr><td><a href="chap0.html">Top of Book</a></td><td><a href="chap4.html">Previous Chapter</a></td><td><a href="chapInd.html">Next Chapter</a></td></tr></table>
<br />


<div class="pcenter"><table class="chlink"><tr><td class="chlink1">Goto Chapter: </td><td><a href="chap0.html">Top</a></td><td><a href="chap1.html">1</a></td><td><a href="chap2.html">2</a></td><td><a href="chap3.html">3</a></td><td><a href="chap4.html">4</a></td><td><a href="chapBib.html">Bib</a></td><td><a href="chapInd.html">Ind</a></td></tr></table><br /></div>

</div>

<hr />
<p class="foot">generated by <a href="http://www.math.rwth-aachen.de/~Frank.Luebeck/GAPDoc">GAPDoc2HTML</a></p>
</body>
</html>