We consider relations between the distance of a set \(A\) and the distance of its translated set \(A+x\) from 0, for \(x\in A\), in a normed linear space. If the relation \(d(0,A+x)<d(0,A)+\|x\|\) holds for exactly determined vectors \(x\in A\), where \(A\) is a convex, closed set with positive distance from 0, which we call (TP) property, then this property is equivalent to strict convexity of the space. We show that in uniformly convex spaces the considered property holds.

Translation; uniform convexity; strict convexity

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