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<h3>References</h3>


<p><a id="biBBescheEick98" name="biBBescheEick98"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1681346">BE99a</a></span>]   <b class='BibAuthor'>Besche, H. U. and Eick, B.</b>,
 <i class='BibTitle'>Construction of finite groups</i>,
 <span class='BibJournal'>J. Symbolic Comput.</span>,
 <em class='BibVolume'>27</em> (<span class='BibNumber'>4</span>)
 (<span class='BibYear'>1999</span>),
 <span class='BibPages'>387–404</span>.
</p>


<p><a id="biBBescheEick1000" name="biBBescheEick1000"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1681347">BE99b</a></span>]   <b class='BibAuthor'>Besche, H. U. and Eick, B.</b>,
 <i class='BibTitle'>The groups of order at most 1000 except 512 and 768</i>,
 <span class='BibJournal'>J. Symbolic Comput.</span>,
 <em class='BibVolume'>27</em> (<span class='BibNumber'>4</span>)
 (<span class='BibYear'>1999</span>),
 <span class='BibPages'>405–413</span>.
</p>


<p><a id="biBBescheEick768" name="biBBescheEick768"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1853124">BE01</a></span>]   <b class='BibAuthor'>Besche, H. U. and Eick, B.</b>,
 <i class='BibTitle'>The groups of order \(q^n \cdot p\)</i>,
 <span class='BibJournal'>Comm. Algebra</span>,
 <em class='BibVolume'>29</em> (<span class='BibNumber'>4</span>)
 (<span class='BibYear'>2001</span>),
 <span class='BibPages'>1759–1772</span>.
</p>


<p><a id="biBBEO00" name="biBBEO00"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1826989">BEO01</a></span>]   <b class='BibAuthor'>Besche, H. U., Eick, B. and O'Brien, E. A.,
 <i class='BibTitle'>The groups of order at most 2000</i>,
 <span class='BibJournal'>Electron. Res. Announc. Amer. Math. Soc.</span>,
 <em class='BibVolume'>7</em>
 (<span class='BibYear'>2001</span>),
 <span class='BibPages'>1–4 (electronic)</span>.
</p>


<p><a id="biBBEO01" name="biBBEO01"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1935567">BEO02</a></span>]   <b class='BibAuthor'>Besche, H. U., Eick, B. and O'Brien, E. A.,
 <i class='BibTitle'>A millennium project: constructing small groups</i>,
 <span class='BibJournal'>Internat. J. Algebra Comput.</span>,
 <em class='BibVolume'>12</em> (<span class='BibNumber'>5</span>)
 (<span class='BibYear'>2002</span>),
 <span class='BibPages'>623–644</span>.
</p>


<p><a id="biBBurrell2021" name="biBBurrell2021"></a></p>
<p class='BibEntry'>
[<span class='BibKey'>Bur21</span>]   <b class='BibAuthor'>Burrell, D.</b>,
<a href="https://doi.org/10.1080/00927872.2021.2006680"><i class='BibTitle'>On the number of groups of order 1024</i></a>,
 <span class='BibJournal'>Communications in Algebra</span>
 (<span class='BibYear'>2021</span>),
 <span class='BibPages'>1–3</span>.
</p>


<p><a id="biBDEi05" name="biBDEi05"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=2166799">DE05</a></span>]   <b class='BibAuthor'>Dietrich, H. and Eick, B.</b>,
 <i class='BibTitle'>On the groups of cube-free order</i>,
 <span class='BibJournal'>J. Algebra</span>,
 <em class='BibVolume'>292</em> (<span class='BibNumber'>1</span>)
 (<span class='BibYear'>2005</span>),
 <span class='BibPages'>122–137</span>.
</p>


<p><a id="biBEOB99" name="biBEOB99"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1717413">EO99a</a></span>]   <b class='BibAuthor'>Eick, B. and O'Brien, E. A.,
 <i class='BibTitle'>Enumerating \(p\)-groups</i>,
 <span class='BibJournal'>J. Austral. Math. Soc. Ser. A</span>,
 <em class='BibVolume'>67</em> (<span class='BibNumber'>2</span>)
 (<span class='BibYear'>1999</span>),
 <span class='BibPages'>191–205</span><br />
(<span class='BibNote'>Group theory</span>).
</p>


<p><a id="biBEOB98" name="biBEOB98"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1672078">EO99b</a></span>]   <b class='BibAuthor'>Eick, B. and O'Brien, E. A. ('>Matzat, B. H., Greuel, G.-M. and Hiss, G., Eds.),
 <i class='BibTitle'>The groups of order \(512\)</i>,
  in  <i class='BibBooktitle'>Algorithmic algebra and number theory (Heidelberg,
      1997)</i>,
 <span class='BibPublisher'>Springer</span>,
 <span class='BibAddress'>Berlin</span>
 (<span class='BibYear'>1999</span>),
 <span class='BibPages'>379–380</span><br />
(<span class='BibNote'>Proceedings  of Abschlusstagung des DFG Schwerpunktes
  Algorithmische Algebra und Zahlentheorie in Heidelberg</span>).
</p>


<p><a id="biBGir03" name="biBGir03"></a></p>
<p class='BibEntry'>
[<span class='BibKey'>Gir03</span>]   <b class='BibAuthor'>Girnat, B.</b>,
 <i class='BibTitle'>Klassifikation der Gruppen bis zur Ordnung
      \(p^5\)</i>,
 <span class='BibType'>Staatsexamensarbeit</span>,
 <span class='BibSchool'>TU Braunschweig</span>,
 <span class='BibAddress'>Braunschweig, Germany</span>
 (<span class='BibYear'>2003</span>).
</p>


<p><a id="biBNew77" name="biBNew77"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=0453862">New77</a></span>]   <b class='BibAuthor'>Newman, M. F.</b> (<span class='BibEditor'>Bryce, R. A., Cossey, J. and Newman, M. F.</span>, Eds.),
 <i class='BibTitle'>Determination of groups of prime-power order</i>,
  in  <i class='BibBooktitle'>Group theory (Proc. Miniconf., Australian Nat. Univ.,
              Canberra, 1975)</i>,
 <span class='BibPublisher'>Springer</span>,
 <span class='BibSeries'>Lecture Notes in Math.</span>,
 <em class='BibVolume'>573</em>,
 <span class='BibAddress'>Berlin</span>
 (<span class='BibYear'>1977</span>),
 <span class='BibPages'>73–84. Lecture Notes in Math., Vol. 573</span><br />
(<span class='BibNote'>Lecture Notes in Mathematics, Vol. 573</span>).
</p>


<p><a id="biBNOV04" name="biBNOV04"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=2068084">NOV04</a></span>]   <b class='BibAuthor'>Newman, M. F., O'Brien, E. A. and Vaughan-Lee, M. R.,
 <i class='BibTitle'>Groups and nilpotent Lie rings whose order is the sixth
              power of a prime</i>,
 <span class='BibJournal'>J. Algebra</span>,
 <em class='BibVolume'>278</em> (<span class='BibNumber'>1</span>)
 (<span class='BibYear'>2004</span>),
 <span class='BibPages'>383–401</span>.
</p>


<p><a id="biBOBr90" name="biBOBr90"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1075431">O'B90] '>O'Brien, E. A.</b>,
 <i class='BibTitle'>The \(p\)-group generation algorithm</i>,
 <span class='BibJournal'>J. Symbolic Comput.</span>,
 <em class='BibVolume'>9</em> (<span class='BibNumber'>5-6</span>)
 (<span class='BibYear'>1990</span>),
 <span class='BibPages'>677–698</span><br />
(<span class='BibNote'>Computational group theory, Part 1</span>).
</p>


<p><a id="biBOBr91" name="biBOBr91"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=1128656">O'B91] '>O'Brien, E. A.</b>,
 <i class='BibTitle'>The groups of order \(256\)</i>,
 <span class='BibJournal'>J. Algebra</span>,
 <em class='BibVolume'>143</em> (<span class='BibNumber'>1</span>)
 (<span class='BibYear'>1991</span>),
 <span class='BibPages'>219–235</span>.
</p>


<p><a id="biBOV05" name="biBOV05"></a></p>
<p class='BibEntry'>
[<span class='BibKeyLink'><a href="https://www.ams.org/mathscinet-getitem?mr=2166803">OV05</a></span>]   <b class='BibAuthor'>O'Brien, E. A. and Vaughan-Lee, M. R.,
 <i class='BibTitle'>The groups with order \(p^7\) for odd prime \(p\)</i>,
 <span class='BibJournal'>J. Algebra</span>,
 <em class='BibVolume'>292</em> (<span class='BibNumber'>1</span>)
 (<span class='BibYear'>2005</span>),
 <span class='BibPages'>243–258</span>.
</p>

<p> </p>


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