Exercises
[198] Topics:Distance function, convex sets. Prerequisites:[0R9],[19C].Let \(A⊂ ℝ^ n\) be a closed nonempty set, and \(d_ A\) the distance function defined in the exercise [0R9], that is \(d_ A(x)=\inf _{y∈ A} |x-y|\). Prove that \(A\) is a convex set, if and only if \(d_ A\) is a convex function.
Solution 1