A Lie algebra bundle is a mathematical structure that arises in the context of differential geometry and algebra. It is an extension of the concept of a vector bundle, where instead of focusing solely on vector spaces, we consider fibers that are Lie algebras. #### Components of a Lie Algebra Bundle: 1. **Base Space**: The base space is typically a smooth manifold \( M \). This space serves as the domain over which the bundle is defined.
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