<
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title>ModIsom : a GAP
4 package - References</
title></
head>
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<
h1><
font face=
"Gill Sans,Helvetica,Arial">ModIsom</
font> : a <
font face=
"Gill Sans,Helvetica,Arial">GAP</
font>
4 package - References</
h1><
dl>
<
dt><a name=
"Bag92"><b>[Bag92]</b></a><
dd>
C. Bagiński.
<
br> Modular group algebras of
2-groups of maximal class.
<
br> <
em>Comm. Algebra</
em>,
20(
5):
1229--
1241,
1992.
<
dt><a name=
"Bag99"><b>[Bag99]</b></a><
dd>
C. Bagiński.
<
br> On the isomorphism problem for modular group algebras of elementary
abelian-by-cyclic <i>p</i>-groups.
<
br> <
em>Colloq. Math.</
em>,
82(
1):
125--
136,
1999.
<
dt><a name=
"BC88"><b>[BC88]</b></a><
dd>
C. Bagiński and A. Caranti.
<
br> The modular group algebras of <i>p</i>-groups of maximal class.
<
br> <
em>Canad. J. Math.</
em>,
40(
6):
1422--
1435,
1988.
<
dt><a name=
"BdR21"><b>[BdR21]</b></a><
dd>
O. Broche and Á.
del Río.
<
br> The modular isomorphism problem for two generated groups of class
two.
<
br> <
em>Indian J. Pure Appl. Math.</
em>,
52(
3):
721--
728,
2021.
<
dt><a name=
"BK07"><b>[BK07]</b></a><
dd>
C. Bagiński and A. Konovalov.
<
br> The modular isomorphism problem for finite <i>p</i>-groups with a cyclic
subgroup of index <i>p</i><
sup>
2</
sup>.
<
br> In <
em>Groups St. Andrews
2005. Vol.
1</
em>, volume
339 of <
em>
London Math. Soc. Lecture Note Ser.</
em>, pages
186--
193. Cambridge Univ. Press,
Cambridge,
2007.
<
dt><a name=
"BKRW99"><b>[BKRW99]</b></a><
dd>
F. Bleher, W. Kimmerle, K. W. Roggenkamp, and M. Wursthorn.
<
br> Computational aspects of the isomorphism problem.
<
br> In <
em>Algorithmic algebra and number theory (Heidelberg,
1997)</
em>,
pages
313--
329. Springer, Berlin,
1999.
<
dt><a name=
"Dre89"><b>[Dre89]</b></a><
dd>
V. Drensky.
<
br> The isomorphism problem for modular group algebras of groups with
large centres.
<
br> In <
em>Representation theory, group rings, and coding theory</
em>,
volume
93 of <
em>Contemp. Math.</
em>, pages
145--
153. Amer. Math. Soc.,
Providence, RI,
1989.
<
dt><a name=
"Eic07"><b>[Eic07]</b></a><
dd>
B. Eick.
<
br> Computing automorphism groups and testing isomorphisms for modular
group algebras.
<
br> <
em>J. Algebra</
em>,
320(
11):
3895--
3910,
2008.
<
dt><a name=
"Eic11"><b>[Eic11]</b></a><
dd>
B. Eick.
<
br> Computing nilpotent quotients of associative algebras and algebras
satisfying a polynomial identity.
<
br> <
em>Internat. J. Algebra Comput.</
em>,
21(
8):
1339--
1355,
2011.
<
dt><a name=
"EKo11"><b>[EKo11]</b></a><
dd>
B. Eick and A. Konovalov.
<
br> The modular isomorphism problem for the groups of order
512.
<
br> In <
em>Groups St Andrews
2009 in Bath. Volume
2</
em>, volume
388
of <
em>London Math. Soc. Lecture Note Ser.</
em>, pages
375--
383. Cambridge Univ.
Press, Cambridge,
2011.
<
dt><a name=
"GL24"><b>[GL24]</b></a><
dd>
D. García-Lucas.
<
br> The modular isomorphism problem and abelian direct factors.
<
br> <
em>Meditt. J. of Math.</
em>,
21:
Article no.
18,
2024.
<
dt><a name=
"GLdR23"><b>[GLdR23]</b></a><
dd>
D. García-Lucas and Á.
del Río.
<
br> On the modular isomorphism problem for
2-generated groups with cyclic
derived subgroup.
<
br> <
em>J. Alg. App.</
em>,
2024.
<
br>
https://doi.org/10.
1142/S0219498825503311.
<
dt><a name=
"GLdRS22"><b>[GLdRS22]</b></a><
dd>
Diego García-Lucas, Ángel
del Río, and Mima Stanojkovski.
<
br> On group invariants determined by modular group algebras: even versus
odd characteristic.
<
br> <
em>Algebr. Represent. Theory</
em>,
26(
6):
2683--
2707,
2023.
<
dt><a name=
"GLM24"><b>[GLM24]</b></a><
dd>
D. García-Lucas and L. Margolis.
<
br> On the modular isomorphism problem for groups of nilpotency class
2
with cyclic
center.
<
br> <
em>Forum Math.</
em>,
36(
5):
1321--
1340,
2024.
<
dt><a name=
"GLMdR22"><b>[GLMdR22]</b></a><
dd>
D. García-Lucas, L. Margolis, and Á.
del Río.
<
br> Non-isomorphic
2-groups with isomorphic modular group algebras.
<
br> <
em>J. Reine Angew. Math.</
em>,
783:
269--
274,
2022.
<
dt><a name=
"Her07"><b>[Her07]</b></a><
dd>
M. Hertweck.
<
br> A note on the modular group algebras of odd <i>p</i>-groups of
<i>M</i>-length three.
<
br> <
em>Publ. Math. Debrecen</
em>,
71(
1-
2):
83--
93,
2007.
<
dt><a name=
"HS06"><b>[HS06]</b></a><
dd>
M. Hertweck and M. Soriano.
<
br> On the modular isomorphism problem: groups of order
2<
sup>
6</
sup>.
<
br> In <
em>Groups, rings and algebras</
em>, volume
420 of <
em>Contemp.
Math.</
em>, pages
177--
213. Amer. Math. Soc., Providence, RI,
2006.
<
dt><a name=
"Jen41"><b>[Jen41]</b></a><
dd>
S. A. Jennings.
<
br> The structure of the group ring of a <i>p</i>-group over a modular
field.
<
br> <
em>Trans. Amer. Math. Soc.</
em>,
50:
175--
185,
1941.
<
dt><a name=
"MM22"><b>[MM22]</b></a><
dd>
L. Margolis and T. Moede.
<
br> The Modular Isomorphism Problem for
small groups -- revisiting
Eick
's algorithm.
<
br> <
em>Journal of Computational Algebra</
em>,
1-
2:
100001,
2022.
<
dt><a name=
"MS22"><b>[MS22]</b></a><
dd>
L. Margolis and M. Stanojkovski.
<
br> On the modular isomorphism problem for groups of class
3 and
obelisks.
<
br> <
em>J. Group Theory</
em>,
25(
1):
163--
206,
2022.
<
dt><a name=
"MSS23"><b>[MSS23]</b></a><
dd>
L. Margolis, T. Sakurai, and M. Stanojkovski.
<
br> Abelian invariants and a reduction theorem for the modular
isomorphism problem.
<
br> <
em>J. Algebra</
em>,
636:
1--
27,
2023.
<
dt><a name=
"PS72"><b>[PS72]</b></a><
dd>
I. B. S. Passi and S. K. Sehgal.
<
br> Isomorphism of modular group algebras.
<
br> <
em>Math. Z.</
em>,
129:
65--
73,
1972.
<
dt><a name=
"RS83"><b>[RS83]</b></a><
dd>
J. Ritter and S. K. Sehgal.
<
br> Isomorphism of group rings.
<
br> <
em>Arch. Math. (Basel)</
em>,
40(
1):
32--
39,
1983.
<
dt><a name=
"RS93"><b>[RS93]</b></a><
dd>
K. W. Roggenkamp and L. L. Scott.
<
br> Automorphisms and nonabelian cohomology: an algorithm.
<
br> <
em>Linear Algebra Appl.</
em>,
192:
355--
382,
1993.
<
dt><a name=
"San85"><b>[San85]</b></a><
dd>
R. Sandling.
<
br> The isomorphism problem for group rings: a survey.
<
br> In <
em>Orders and their applications (Oberwolfach,
1984)</
em>, pages
256--
288. Springer, Berlin,
1985.
<
dt><a name=
"San89"><b>[San89]</b></a><
dd>
R. Sandling.
<
br> The modular group algebra of a central-elementary-by-abelian
<i>p</i>-group.
<
br> <
em>Arch. Math. (Basel)</
em>,
52(
1):
22--
27,
1989.
<
dt><a name=
"Wur93"><b>[Wur93]</b></a><
dd>
M. Wursthorn.
<
br> Isomorphisms of modular group algebras: an algorithm and its
application to groups of order
2\sp
6.
<
br> <
em>J. Symbolic Comput.</
em>,
15(
2):
211--
227,
1993.
</
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