<?xml version="1.0" encoding="UTF-8"?> <!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 (Circle) - References</title> <meta http-equiv="content-type" content="text/html; charset=UTF-8" /> <meta name="generator" content="GAPDoc2HTML" /> <link rel="stylesheet" type="text/css" href="manual.css" /> </head> <body> <div class="chlinktop"><span class="chlink1">Goto Chapter: </span><a href="chap0.html">Top</a> <a href="chap1.html">1</a> <a href="chap2.html">2</a> <a href="chap3.html">3</a> <a href="chap4.html">4</a> <a href="chapBib.html">Bib</a> <a href="chapInd.html">Ind</a> </div> <div class="chlinkprevnexttop"> <a href="chap0.html">Top of Book</a> <a href="chap4.html">Previous Chapter</a> <a href="chapInd.html">Next Chapter</a> </div> <p><a id="X7A6F98FD85F02BFE" name="X7A6F98FD85F02BFE"></a></p> <h3>References</h3> <p><a id="biBAmberg-Kazarin-2000" name="biBAmberg-Kazarin-2000"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1797973">AK00</a></span>] <b class='Bib_author'>Amberg, B. and Kazarin, L. S.</b> <i class='Bib_title'>On the adjoint group of a finite nilpotent p-algebra</i>, <span class='Bib_journal'>J. Math. Sci. (New York)</span>, <em class='Bib_volume'>102</em> (<span class='Bib_number'>3</span>), (<span class='Bib_year'>2000</span>), <span class='Bib_pages'>p. 3979--3997</span>. </p> <p><a id="biBAmberg-Sysak-2001" name="biBAmberg-Sysak-2001"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1949558">AS01</a></span>] <b class='Bib_author'>Amberg, B. and Sysak, Y. P.</b> <i class='Bib_title'>Radical rings and their adjoint groups</i>, in <i class='Bib_booktitle'>Topics in infinite groups</i>, <span class='Bib_publisher'>Dept. Math., Seconda Univ. Napoli, Caserta</span>, <span class='Bib_series'>Quad. Mat.</span>, <em class='Bib_volume'>8</em>, (<span class='Bib_year'>2001</span>), <span class='Bib_pages'>p. 21--43</span>. </p> <p><a id="biBAmberg-Sysak-2002" name="biBAmberg-Sysak-2002"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1877869">AS02</a></span>] <b class='Bib_author'>Amberg, B. and Sysak, Y. P.</b> <i class='Bib_title'>Radical rings with soluble adjoint groups</i>, <span class='Bib_journal'>J. Algebra</span>, <em class='Bib_volume'>247</em> (<span class='Bib_number'>2</span>), (<span class='Bib_year'>2002</span>), <span class='Bib_pages'>p. 692--702</span>. </p> <p><a id="biBAmberg-Sysak-2004" name="biBAmberg-Sysak-2004"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR2067614">AS04</a></span>] <b class='Bib_author'>Amberg, B. and Sysak, Y. P.</b> <i class='Bib_title'>Associative rings with metabelian adjoint group</i>, <span class='Bib_journal'>J. Algebra</span>, <em class='Bib_volume'>277</em> (<span class='Bib_number'>2</span>), (<span class='Bib_year'>2004</span>), <span class='Bib_pages'>p. 456--473</span>. </p> <p><a id="biBArtemovych-Ishchuk-1997" name="biBArtemovych-Ishchuk-1997"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1685930">AI97</a></span>] <b class='Bib_author'>Artemovych, O. D. and Ishchuk, Y. B.</b> <i class='Bib_title'>On semiperfect rings determined by adjoint groups</i>, <span class='Bib_journal'>Mat. Stud.</span>, <em class='Bib_volume'>8</em> (<span class='Bib_number'>2</span>), (<span class='Bib_year'>1997</span>), <span class='Bib_pages'>p. 162--170, 237</span>. </p> <p><a id="biBGorlov-1995" name="biBGorlov-1995"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1369554">Gor95</a></span>] <b class='Bib_author'>Gorlov, V. O.</b> <i class='Bib_title'>Finite nilpotent algebras with a metacyclic quasiregular group</i>, <span class='Bib_journal'>Ukra\"\i n. Mat. Zh.</span>, <em class='Bib_volume'>47</em> (<span class='Bib_number'>10</span>), (<span class='Bib_year'>1995</span>), <span class='Bib_pages'>p. 1426--1431</span>. </p> <p><a id="biBKazarin-Soules-2004" name="biBKazarin-Soules-2004"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR2049690">KS04</a></span>] <b class='Bib_author'>Kazarin, L. S. and Soules, P.</b> <i class='Bib_title'>Finite nilpotent p-algebras whose adjoint group has three generators</i>, <span class='Bib_journal'>JP J. Algebra Number Theory Appl.</span>, <em class='Bib_volume'>4</em> (<span class='Bib_number'>1</span>), (<span class='Bib_year'>2004</span>), <span class='Bib_pages'>p. 113--127</span>. </p> <p><a id="biBPopovich-Sysak-1997" name="biBPopovich-Sysak-1997"></a></p> <p class='Bib_entry'> [<span class='Bib_keyLink'><a href="http://www.ams.org/mathscinet-getitem?mr=MR1678903">PS97</a></span>] <b class='Bib_author'>Popovich, S. V. and Sysak, Y. P.</b> <i class='Bib_title'>Radical algebras whose subgroups of adjoint groups are subalgebras</i>, <span class='Bib_journal'>Ukra\"\i n. Mat. Zh.</span>, <em class='Bib_volume'>49</em> (<span class='Bib_number'>12</span>), (<span class='Bib_year'>1997</span>), <span class='Bib_pages'>p. 1646--1652</span>. </p> <p> </p> <div class="chlinkprevnextbot"> <a href="chap0.html">Top of Book</a> <a href="chap4.html">Previous Chapter</a> <a href="chapInd.html">Next Chapter</a> </div> <div class="chlinkbot"><span class="chlink1">Goto Chapter: </span><a href="chap0.html">Top</a> <a href="chap1.html">1</a> <a href="chap2.html">2</a> <a href="chap3.html">3</a> <a href="chap4.html">4</a> <a href="chapBib.html">Bib</a> <a href="chapInd.html">Ind</a> </div> <hr /> <p class="foot">generated by <a href="http://www.math.rwth-aachen.de/~Frank.Luebeck/GAPDoc">GAPDoc2HTML</a></p> </body> </html>