Let p be a prime, F a field containing a primitive pth root of unity, and E/F a cyclic extension of degree p. Using the Bloch-Kato Conjecture we determine precise conditions for the cohomology group Hⁿ(E):=Hⁿ(G_E,F_p) to be free or trivial as an F_p[\Gal(E/F)]-module, and we examine when these properties for Hⁿ(E) are inherited by H^k(E), k>n. By analogy with cohomological dimension, we introduce notions of cohomological freeness and cohomological triviality, and we give examples of Hⁿ(E) free or trivial for each n∈ N with prescribed cohomological dimension.

The first author was supported in part by NSERC grant R3276A01.
The second author was supported in part by NSERC grant R0370A01, by the Institute for Advanced Study, Princeton, by a Distinguished Professorship during 2004-2005 at the University of Western Ontario, and by the Mathematical Sciences Research Institute, Berkeley.
The third author was supported in part by NSA grant MDA904-02-1-0061.