In this chapter we make contact with the theory of ordinary differential equations. A vector field defines an ordinary differential equation on a manifold, and just as in the Euclidean case, solutions to this ordinary differential equation exist (at least for a short time) and are unique. As with the Implicit Function Theorem, the local version of this statement follows readily from the corresponding Euclidean statement, but the global version is deeper.

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Flows

  • Will J. Merry

摘要

In this chapter we make contact with the theory of ordinary differential equations. A vector field defines an ordinary differential equation on a manifold, and just as in the Euclidean case, solutions to this ordinary differential equation exist (at least for a short time) and are unique. As with the Implicit Function Theorem, the local version of this statement follows readily from the corresponding Euclidean statement, but the global version is deeper.