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Line 1: A function <math>f : \mathcal{R}^n \to \R^+</math> is '''logarithmically concave''' (or '''log-concave''' for short), if its [[natural logarithm]] <math>\ln(f(x))</math>, is [[concave function\|concave]]. Every concave function is log-concave, however the reverse does not necessarily hold (e.g., <math>\exp\{-x^2\}</math>). In parallel, a function is '''[[log-convex]]''' if its natural log is convex.

Logarithmically concave function: Difference between revisions