. . . . . . . "In mathematics, a Borel measure \u03BC on n-dimensional Euclidean space is called logarithmically concave (or log-concave for short) if, for any compact subsets A and B of and 0 < \u03BB < 1, one has where \u03BB A + (1 \u2212 \u03BB) B denotes the Minkowski sum of \u03BB A and (1 \u2212 \u03BB) B."@en . "In matematica, una misura di Borel \u03BC in uno spazio euclideo n-dimensionale Rn \u00E8 detta logaritmicamente concava se, dati due qualunque sottoinsiemi compatti A e B di Rn e dato \u03BB tale che , si ha in cui \u03BB A + (1 \u2212 \u03BB) B denota la somma di Minkowski di \u03BB A e (1 \u2212 \u03BB) B."@it . . . "In matematica, una misura di Borel \u03BC in uno spazio euclideo n-dimensionale Rn \u00E8 detta logaritmicamente concava se, dati due qualunque sottoinsiemi compatti A e B di Rn e dato \u03BB tale che , si ha in cui \u03BB A + (1 \u2212 \u03BB) B denota la somma di Minkowski di \u03BB A e (1 \u2212 \u03BB) B."@it . "Misura logaritmicamente concava"@it . "9368110"^^ . . . . . "In mathematics, a Borel measure \u03BC on n-dimensional Euclidean space is called logarithmically concave (or log-concave for short) if, for any compact subsets A and B of and 0 < \u03BB < 1, one has where \u03BB A + (1 \u2212 \u03BB) B denotes the Minkowski sum of \u03BB A and (1 \u2212 \u03BB) B."@en . . "1863"^^ . "Logarithmically concave measure"@en . . . . "1068203245"^^ . . . . . . . . .