A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP

Research Article

Year 2018, , 68 - 72, 05.07.2018

https://doi.org/10.24330/ieja.440216

Cited By: 1

R. Boltje and B. Kulshammer, On the depth 2 condition for group algebra and Hopf algebra extensions, J. Algebra, 323(6) (2010), 1783-1796.
R. Boltje and B. Kulshammer, Group algebra extensions of depth one, Algebra Number Theory, 5(1) (2011), 63-73.
C. W. Curtis and I. Reiner, Methods of Representation Theory, Vol. II, with applications to nite groups and orders, Pure and Applied Mathematics (New York), A Wiley-Interscience Publication, John Wiley & Sons, Inc., New York, 1987.
L. Kadison and K. Szlachanyi, Bialgebroid actions on depth two extensions, Adv. Math., 179(1) (2003), 75-121.
M. Linckelmann, On splendid derived and stable equivalences between blocks of nite groups, J. Algebra, 242(2) (2001), 819-843.
L. Puig, Nilpotent blocks and their source algebras, Invent. Math., 93(1) (1988), 77-116.
L. Puig, Pointed groups and construction of modules, J. Algebra, 116(1) (1988), 7-129.
[L. Puig, The hyperfocal subalgebra of a block, Invent. Math., 141(2) (2000), 365-397.
J.-P. Serre, Corps Locaux, Deuxieme edition, Publications de l'Universite de Nancago, No. VIII, Hermann, Paris, 1968.
J. Thevenaz, G-Algebras and Modular Representation Theory, Oxford Mathematical Monographs, Oxford Science Publications, The Clarendon Press, Oxford University Press, New York, 1995.
A. Watanabe, Note on hyperfocal subalgebras of blocks of nite groups, J. Algebra, 322(2) (2009), 449-452.

Year 2018, , 68 - 72, 05.07.2018

https://doi.org/10.24330/ieja.440216

Cited By: 1

By results of Boltje and Kulshammer, if a source algebra A of a

principal p-block of a nite group with a defect group P with inertial quotient

E is a depth two extension of the group algebra of P, then A is isomorphic

to a twisted group algebra of the group P o E. We show in this note that

this is true for arbitrary blocks. We observe further that the results of Boltje

and Kulshammer imply that A is a depth two extension of its hyperfocal

subalgebra, with a criterion for when this is a depth one extension. By a

result of Watanabe, this criterion is satised if the defect groups are abelian.

R. Boltje and B. Kulshammer, On the depth 2 condition for group algebra and Hopf algebra extensions, J. Algebra, 323(6) (2010), 1783-1796.
R. Boltje and B. Kulshammer, Group algebra extensions of depth one, Algebra Number Theory, 5(1) (2011), 63-73.
C. W. Curtis and I. Reiner, Methods of Representation Theory, Vol. II, with applications to nite groups and orders, Pure and Applied Mathematics (New York), A Wiley-Interscience Publication, John Wiley & Sons, Inc., New York, 1987.
L. Kadison and K. Szlachanyi, Bialgebroid actions on depth two extensions, Adv. Math., 179(1) (2003), 75-121.
M. Linckelmann, On splendid derived and stable equivalences between blocks of nite groups, J. Algebra, 242(2) (2001), 819-843.
L. Puig, Nilpotent blocks and their source algebras, Invent. Math., 93(1) (1988), 77-116.
L. Puig, Pointed groups and construction of modules, J. Algebra, 116(1) (1988), 7-129.
[L. Puig, The hyperfocal subalgebra of a block, Invent. Math., 141(2) (2000), 365-397.
J.-P. Serre, Corps Locaux, Deuxieme edition, Publications de l'Universite de Nancago, No. VIII, Hermann, Paris, 1968.
J. Thevenaz, G-Algebras and Modular Representation Theory, Oxford Mathematical Monographs, Oxford Science Publications, The Clarendon Press, Oxford University Press, New York, 1995.
A. Watanabe, Note on hyperfocal subalgebras of blocks of nite groups, J. Algebra, 322(2) (2009), 449-452.

There are 11 citations in total.

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Articles
Authors	Markus Linckelmann This is me
Publication Date	July 5, 2018
Published in Issue	Year 2018

APA	Linckelmann, M. (2018). A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP. International Electronic Journal of Algebra, 24(24), 68-72. https://doi.org/10.24330/ieja.440216
AMA	Linckelmann M. A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP. IEJA. July 2018;24(24):68-72. doi:10.24330/ieja.440216
Chicago	Linckelmann, Markus. “A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP”. International Electronic Journal of Algebra 24, no. 24 (July 2018): 68-72. https://doi.org/10.24330/ieja.440216.
EndNote	Linckelmann M (July 1, 2018) A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP. International Electronic Journal of Algebra 24 24 68–72.
IEEE	M. Linckelmann, “A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP”, IEJA, vol. 24, no. 24, pp. 68–72, 2018, doi: 10.24330/ieja.440216.
ISNAD	Linckelmann, Markus. “A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP”. International Electronic Journal of Algebra 24/24 (July 2018), 68-72. https://doi.org/10.24330/ieja.440216.
JAMA	Linckelmann M. A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP. IEJA. 2018;24:68–72.
MLA	Linckelmann, Markus. “A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP”. International Electronic Journal of Algebra, vol. 24, no. 24, 2018, pp. 68-72, doi:10.24330/ieja.440216.
Vancouver	Linckelmann M. A NOTE ON THE DEPTH OF A SOURCE ALGEBRA OVER ITS DEFECT GROUP. IEJA. 2018;24(24):68-72.

International Electronic Journal of Algebra