Galois module structure for Artin-Schreier theory over bicyclic extensions
Heller, Lauren
If K/F is a Galois field extension with Galois group of prime power order distinct from char(F), then Gal(K/F) acts on pth power classes of K. The structure of the resulting module is known for Gal(K/F) isomorphic to a cyclic group of prime power order or the Klein 4-group. We use Artin-Schreier theory to produce a similar decomposition for characteristic p extensions with bicyclic Galois groups of exponent p.
Schultz, Andrew (advisor)
Mathematics (department)
2017
Academic theses
ir:734
local: WCTC_2017_HellerLauren_Galoismodulestructur
thesiscollection:440