Difference between revisions of "Frobenius theorem on Pfaffian systems"

A theorem on the conditions for a system of Pfaffian equations (cf. Pfaffian equation) to be completely integrable, or (in geometrical terms) on conditions under which a given field of -dimensional tangent subspaces on a differentiable manifold is the tangent field of some foliation. For several equivalent formulations of the Frobenius theorem, see the articles Involutive distribution; Cauchy problem; for a version with minimum differentiability requirements see [2]. The name of the theorem is connected with the account of it in [1], but does not accord with the information given there about its history.

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G. Frobenius actually also treats the normal form of a differential form of degree 1.