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Line 1: The '''Browder fixed -point theorem''' is a refinement of the [[Banach fixed -point theorem]] for [[Uniformly convex space\|uniformly convex Banach spaces]]. It asserts that if <math>K</math> is a nonempty [[convex set\|convex]] closed bounded set in uniformly convex Banach space and <math>f</math> is a mapping of <math>K</math> into itself such that <math>\\|f(x)-f(y)\\|\leq\\|x-y\\|</math> (i.e. <math>f</math> is ''non-expansive''), then <math>f</math> has a [[fixed point (mathematics)\|fixed point]]. ==History== Line 6: ==See also== * [[Fixed-point theorem]]s * [[Banach fixed -point theorem]] ==References==

Browder fixed-point theorem: Difference between revisions