Critical point set is closed: Difference between revisions

Revision as of 23:51, 16 January 2008

This article gives the statement and possibly proof of a theorem that discusses regular values, critical values, regular points or critical points of a smooth map between differential manifolds

Let $f : M \to N$ be a smooth map of differential manifolds. Then, the set of critical points of $f$ is a closed subset of $M$ ; equivalently, the set of regular points of $f$ is an open subset of $M$ .

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+{{regular value fact}}
 ==Statement==
 Let <math>f:M \to N</math> be a [[smooth map]] of [[differential manifold]]s. Then, the set of [[critical point]]s of <math>f</math> is a [[tps:closed subset|closed subset]] of <math>M</math>; equivalently, the set of [[regular point]]s of <math>f</math> is an [[tps:open subset|open subset]] of <math>M</math>.