Cyclic algebras, Schur indices, norms, and Galois modules
Abstract
Let p be a prime and suppose that K/F is a cyclic extension of degree pn with group G. Let J be the FpG-module K*/K*p of pth-power classes. In our previous paper we established precise conditions for J to contain an indecomposable direct summand of dimension not a power of p. At most one such summand exists, and its dimension must be pi+1 for some 0<=i<n. We show that for all primes p and all 0<=i<n, there exists a field extension K/F with a summand of dimension pi+1.
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