Logarithmically convex function

In mathematics, a function f is logarithmically convex or superconvex if log ∘ f {\displaystyle {\log }\circ f} , the composition of the logarithm with f, is itself a convex function. == Definition == Let X be a convex subset of a real vector space, and let f : X → R be a function taking non-negative values.

Source: Wikipedia — Logarithmically convex function (CC BY-SA 4.0)

Logarithmically convex function

In mathematics, a function f is logarithmically convex or superconvex if log ∘ f {\displaystyle {\log }\circ f} , the composition of the logarithm with f, is itself a convex function. == Definition == Let X be a convex subset of a real vector space, and let f : X → R be a function taking non-negative values.

Source: Wikipedia "Logarithmically convex function" · CC BY-SA 4.0

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