| Abstract: | ![]()
Abstract Let H be a finite dimensional Hopf algebra over a field k. We show that H contains a unique maximal Hopf ideal J w (H) contained in J(H), the Jacobson radical of H. We give various characterizations of J w (H), for example J w (H) = Ann H ((H/J(H))?n ) for all large enough n. The smallest positive integer n with this property is denoted by l w (H). We prove that l w (H) equals the smallest number n such that (H/J(H))?n contains every projective indecomposable H/J w (H)-module as a direct summand. This also equals the minimal n such that the tensor product of n suitable simple H-modules contains the projective cover of the trivial H/J w (H)-module as a direct summand. We define projective homomorphisms between H-modules, which are used to obtain various reciprocity laws for tensor products of simple H-modules and their projective indecomposable direct summands. We also discuss some consequences of our general results in case H = kG is a group algebra of a finite group G and k is a field of characteristic p. |
