A convexity criterion via the De Giorgi slope
Abstract
Let X be a Banach space and f∈C1(X) be bounded from below. We show that if for some m≥ 1, the function x \|∇ f(x)\|m is convex, then f is convex. We also establish a more general version of this result: if f is continuous and bounded from below, then it is convex, provided x sf(x)m is convex for some m≥ 1, where sf denotes the (De Giorgi) metric slope of f.
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