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A01=Andreas Seidel
A01=Chris Parker
A01=Gerald Pientka
A01=Gernot Stroth
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Age Group_Uncategorized
Author_Andreas Seidel
Author_Chris Parker
Author_Gerald Pientka
Author_Gernot Stroth
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Finite Groups Which Are Almost Groups of Lie Type in Characteristic $mathbf {p}$

Let p be a prime. In this paper we investigate finite K{2,p}-groups G which have a subgroup H ? G such that K ? H = NG(K) ? Aut(K) for K a simple group of Lie type in characteristic p, and |G : H| is coprime to p. If G is of local characteristic p, then G is called almost of Lie type in characteristic p. Here G is of local characteristic p means that for all nontrivial p-subgroups P of G, and Q the largest normal p-subgroup in NG(P) we have the containment CG(Q) ? Q. We determine details of the structure of groups which are almost of Lie type in characteristic p. In particular, in the case that the rank of K is at least 3 we prove that G = H. If H has rank 2 and K is not PSL3(p) we determine all the examples where G = H. We further investigate the situation above in which G is of parabolic characteristic p. This is a weaker assumption than local characteristic p. In this case, especially when p ? {2, 3}, many more examples appear. In the appendices we compile a catalogue of results about the simple groups with proofs. These results may be of independent interest. See more
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A01=Andreas SeidelA01=Chris ParkerA01=Gerald PientkaA01=Gernot StrothAge Group_UncategorizedAuthor_Andreas SeidelAuthor_Chris ParkerAuthor_Gerald PientkaAuthor_Gernot Strothautomatic-updateCategory1=Non-FictionCategory=PBFCategory=PBMWCOP=United StatesDelivery_Delivery within 10-20 working daysLanguage_EnglishPA=Not available (reason unspecified)Price_€50 to €100PS=Activesoftlaunch
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Product Details
  • Weight: 272g
  • Dimensions: 178 x 254mm
  • Publication Date: 29 Feb 2024
  • Publisher: American Mathematical Society
  • Publication City/Country: United States
  • Language: English
  • ISBN13: 9781470467296

About Andreas SeidelChris ParkerGerald PientkaGernot Stroth

Chris Parker University of Birmingham United Kingdom.Gerald Pientka Halle Germany.Andreas Seidel Magdeburg Germany.Gernot Stroth Universitat Halle-Wittenberg Germany.

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