Type: Article
Publication Date: 1981-01-01
Citations: 1
DOI: https://doi.org/10.1090/s0002-9947-1981-0607115-6
A Galois correspondence for finitely generated field extensions $k/h$ is presented in the case characteristic $h = p \ne 0$. A field extension $k/h$ is Galois if it is modular and $h$ is separably algebraically closed in $k$. Galois groups are the direct limit of groups of higher derivations having rank a power of $p$. Galois groups are characterized in terms of abelian iterative generating sets in a manner which reflects the similarity between the finite rank and infinite rank theories of Heerema and Deveney [9] and gives rise to a theory which encompasses both. Certain intermediate field theorems obtained by Deveney in the finite rank case are extended to the general theory.
| Action | Title | Year | Authors |
|---|---|---|---|
| + | Higher Derivation Galois Theory of Inseparable Field Extensions | 1996 |
James K. Deveney John N. Mordeson |