Revision as of 16:46, 15 October 2004 edit 130.126.175.162 (talk) No edit summary ← Previous edit		Revision as of 16:30, 7 March 2005 edit undo 148.216.18.10 (talk) Typo fixed: from F -> f all the way.... in order to keep consistency. Next edit →
Line 1: In [[mathematics]], the '''inverse function theorem''' gives sufficient conditions for a vector-valued function to be [[invertible]] on an open region containing a point in its ___domain. The theorem states that if at a point ''P'' a function ''f'':'''R'''<sup>''n''</sup> → '''R'''<sup>''n''</sup> has a [[Jacobian]] determinant that is nonzero, and ''Ff'' is continuously differentiable near ''P'', it is an invertible function near ''P''. That is, an [[inverse function]] exists, in some [[neighborhood]] of ''Ff(P)''. The Jacobian matrix of ''f''<sup> -1</sup> at ''f''(''P'') is then the inverse of J''f'', evaluated at P.

Inverse function theorem: Difference between revisions