Subbundle

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In mathematics, a subbundle ${\displaystyle L}$ of a vector bundle ${\displaystyle E}$ over a topological space ${\displaystyle M}$ is a collection of linear subspaces ${\displaystyle L_x}$of the fibers ${\displaystyle E_x}$ of ${\displaystyle E}$ at ${\displaystyle x}$ in ${\displaystyle M,}$ that make up a vector bundle in their own right.

In connection with foliation theory, a subbundle of the tangent bundle of a smooth manifold may be called a distribution (of tangent vectors).

If locally, in a neighborhood ${\displaystyle N_x}$ of ${\displaystyle x\in M}$, a set of vector fields ${\displaystyle Y_k}$ span the vector spaces ${\displaystyle L_y,y\in N_x,}$ and all Lie commutators ${\displaystyle [Y_i,Y_j]}$ are linear combinations of ${\displaystyle Y_1,\dots ,Y_n}$ then one says that ${\displaystyle L}$ is an involutive distribution.

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