TY - JOUR
T1 - Extending Automorphisms and Derivations onto Ore-Extensions
AU - Karpfinger, Christian
AU - Koehler, Henning
AU - Wähling, Heinz
N1 - Publisher Copyright:
© 2015, Springer Basel.
PY - 2015/11/1
Y1 - 2015/11/1
N2 - We study the question wether an automorphism σ of a field K can be extended to an automorphism τ of the field of fractions (Formula Presented.) of the Ore-extension (Formula Presented.) (Sect. 3) and wether a σ-derivation (Formula Presented.) of K can be extended to a τ-derivation of Q (Sect. 4), and determine all extensions of σ and (Formula Presented.). Until now these question have only been discussed under special assumptions (for example in [7] and [11]). In particular, little is known on extensions of derivations. The result is in each case a criterion for extendability (Lemmata 3.2 and 4.3). The characterization of all extensions of automorphisms σ from K to Q is well understood (Corollary 3.5 and Theorem 3.12). This is in contrast to the characterization of the extensions of σ-derivations (Formula Presented.), which can only be described satisfactorily under additional assumptions (Theorems 4.8, 4.9, 4.10). We obtain the set of all extensions of σ or (Formula Presented.) easily from a particular extension and the normalizer (Formula Presented.) or (Formula Presented.) (Corollaries 3.3 and 4.4). These normalizers will be described in Sect. 2 by minimal elements of R.
AB - We study the question wether an automorphism σ of a field K can be extended to an automorphism τ of the field of fractions (Formula Presented.) of the Ore-extension (Formula Presented.) (Sect. 3) and wether a σ-derivation (Formula Presented.) of K can be extended to a τ-derivation of Q (Sect. 4), and determine all extensions of σ and (Formula Presented.). Until now these question have only been discussed under special assumptions (for example in [7] and [11]). In particular, little is known on extensions of derivations. The result is in each case a criterion for extendability (Lemmata 3.2 and 4.3). The characterization of all extensions of automorphisms σ from K to Q is well understood (Corollary 3.5 and Theorem 3.12). This is in contrast to the characterization of the extensions of σ-derivations (Formula Presented.), which can only be described satisfactorily under additional assumptions (Theorems 4.8, 4.9, 4.10). We obtain the set of all extensions of σ or (Formula Presented.) easily from a particular extension and the normalizer (Formula Presented.) or (Formula Presented.) (Corollaries 3.3 and 4.4). These normalizers will be described in Sect. 2 by minimal elements of R.
KW - Derivation
KW - Ore-extension
KW - Skew field
KW - Skew polynomial ring
UR - http://www.scopus.com/inward/record.url?scp=84944173232&partnerID=8YFLogxK
U2 - 10.1007/s00025-015-0447-1
DO - 10.1007/s00025-015-0447-1
M3 - Article
AN - SCOPUS:84944173232
SN - 1422-6383
VL - 68
SP - 395
EP - 413
JO - Results in Mathematics
JF - Results in Mathematics
IS - 3-4
ER -