Galois module structure ofpth-power classes of extensions of degreep

Let k be a number field and O k its ring of integers. Let Γ be a finite group, N/k a Galois extension with Galois group isomorphic to Γ , and O N the ring of integers of N . Let M be a maximal O k -order in the semisimple algebra k[Γ ] containing O k [Γ ], and Cl(M) its locally free class group. Whe

Let k be a number field and O its ring of integers. Let ⌫ be the dihedral group k w x w x Ž . of order 8. Let M M be a maximal O -order in k ⌫ containing O ⌫ and C C l l M M k k Ž . its class group. We denote by R R M M the set of realizable classes, that is, the set of Ž . classes c g C C l l M M s

For a finite unramified Galois -extension of function fields over an algebraically closed field of characteristic different from , we find the Galois module structure of the elements of the Jacobian whose orders are powers of .

Let K be a finite extension of Q p , and suppose that KÂQ p is ramified and that the residue field of K has cardinality at least 3. Let K (2) be the second division field of K with respect to a Lubin Tate formal group, and let 1 =Gal(K (2) ÂK). We determine the associated order in K1 of the valuatio