On the Class Group and the Local Class Group of a Pullback

Let p be a fixed prime number. By a p-extension of fields, we understand a Galois extension with pro-p Galois group. If k is a number field, let k Žϱ. be the maximal unramified p-extension of k s k Ž0. , and put Ž Žϱ. . Ä Ž i. 4 Ž . Ž 0 .

We explore the class of generalized nilpotent groups in the universe c of all radical locally finite groups satisfying min-p for every prime p. We obtain that this class is the natural generalization of the class of finite nilpotent groups from the finite universe to the universe c . Moreover, the s

Let G be a finite abelian group, it is a difficult and unsolved problem to find a number field F whose ideal class group is isomorphic to G. In [WAS], Corollary 3.9 and in [COR], Theorem 2, it is proved that every finite abelian group is isomorphic to a factor group of the ideal class group of some

We describe the upper and lower Lie nilpotency index of a modular group algebra ‫ކ‬G of some metabelian group G and apply these results to determine the nilpotency class of the group of units, extending certain results of Shalev without restriction to finite groups. A characterization of modular gro

We prove that any finite abelian group is the ideal class group of the ring of S-integers of some global field of given characteristic. ## 1999 Academic Press Nous prouvons que tout groupe abe lien fini est groupe des classes d'ide aux de l'anneau des S-entiers d'un corps global de caracte ristiqu