Difference between revisions of "Statements of conjectures"

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(Created page with "'''Donovan's Conjecture''' Let P be a finite p-group and k an algebraically closed field of characteristic p. Then there are only finitely many possible Morita equivalence cl...")
 
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'''Donovan's Conjecture'''
 
'''Donovan's Conjecture'''
  
Let P be a finite p-group and k an algebraically closed field of characteristic p. Then there are only finitely many possible Morita equivalence classes for blocks of kG for finite groups G with defect group isomorphic to P.
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Let P be a finite p-group and k an algebraically closed field of characteristic p. Then there are only finitely many possible Morita equivalence classes for blocks of $kG$ for finite groups G with defect group isomorphic to P.

Revision as of 16:45, 16 August 2018

Donovan's Conjecture

Let P be a finite p-group and k an algebraically closed field of characteristic p. Then there are only finitely many possible Morita equivalence classes for blocks of $kG$ for finite groups G with defect group isomorphic to P.