B4.4

Differentiable Manifolds | Part II, 2002

State and prove Stokes' Theorem for compact oriented manifolds-with-boundary.

[You may assume results relating local forms on the manifold with those on its boundary provided you state them clearly.]

Deduce that every differentiable map of the unit ball in Rn\mathbb{R}^{n} to itself has a fixed point.

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