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Annals of global analysis and geometry, 2021-03, Vol.59 (2), p.197-231
Ort / Verlag
Dordrecht: Springer Netherlands
Erscheinungsjahr
2021
Quelle
Alma/SFX Local Collection
Beschreibungen/Notizen
Let
Q
→
M
be a principal
G
-bundle, and
B
0
a connection on
Q
. We introduce an infinitesimal homogeneity condition for sections in an associated vector bundle
Q
×
G
V
with respect to
B
0
, and, inspired by the well known Ambrose–Singer theorem, we prove the existence of a connection which satisfies a system of parallelism conditions. We explain how this general theorem can be used to prove the known Ambrose–Singer type theorems by an appropriate choice of the initial system of data. We also obtain new applications, which cannot be obtained using the known formalisms, e.g. a classification theorem for locally homogeneous spinors. Finally, we introduce natural local homogeneity and local symmetry conditions for triples
consisting of a Riemannian metric on
M
, a principal bundle on
M
, and a connection on
P
. Our main results concern locally homogeneous and locally symmetric triples, and they can be viewed as bundle versions of the Ambrose–Singer and Cartan theorem.