Restricted holonomy group: Difference between revisions

Revision as of 15:06, 1 September 2007

Definition

Let $M$ be a differential manifold, $E$ a vector bundle over $M$ , and $\nabla$ a connection on $E$ . The restricted holonomy group at $m \in M$ is defined as the subgroup of $G L (E_{m})$ comprising all those linear transformations that occur as the holonomy of a loop that is homotopic to the constant loop.

Facts

The restricted holonomy group is a normal subgroup of the holonomy group, which comprises all the linear transformations that occur as the holonomy of a loop (not necessarily homotopic to the constant loop).

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	The restricted holonomy group is a subgroup of the [[holonomy group]], which comprises all the linear transformations that occur as the [[holonomy of a loop]] (not necessarily homotopic to the constant loop).		The restricted holonomy group is a [[normal subgroup]] of the [[holonomy group]], which comprises all the linear transformations that occur as the [[holonomy of a loop]] (not necessarily homotopic to the constant loop).