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Statements

Subject Item
dbr:Logarithmically_concave_measure
rdfs:label
Misura logaritmicamente concava Logarithmically concave measure
rdfs:comment
In mathematics, a Borel measure μ 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 < λ < 1, one has where λ A + (1 − λ) B denotes the Minkowski sum of λ A and (1 − λ) B. In matematica, una misura di Borel μ in uno spazio euclideo n-dimensionale Rn è detta logaritmicamente concava se, dati due qualunque sottoinsiemi compatti A e B di Rn e dato λ tale che , si ha in cui λ A + (1 − λ) B denota la somma di Minkowski di λ A e (1 − λ) B.
dcterms:subject
dbc:Measures_(measure_theory)
dbo:wikiPageID
9368110
dbo:wikiPageRevisionID
1068203245
dbo:wikiPageWikiLink
dbr:Prékopa–Leindler_inequality dbr:Mathematics dbr:Dimension dbr:Brunn–Minkowski_theorem dbr:Gaussian_measure dbr:Borel_measure dbc:Measures_(measure_theory) dbr:Convolution dbr:Convex_measure dbr:Convex_set dbr:Compact_set dbr:Logarithmically_concave_function dbr:Lebesgue_measure dbr:Euclidean_space dbr:Minkowski_sum
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dbt:Measure_theory dbt:Reflist
dbo:abstract
In matematica, una misura di Borel μ in uno spazio euclideo n-dimensionale Rn è detta logaritmicamente concava se, dati due qualunque sottoinsiemi compatti A e B di Rn e dato λ tale che , si ha in cui λ A + (1 − λ) B denota la somma di Minkowski di λ A e (1 − λ) B. In mathematics, a Borel measure μ 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 < λ < 1, one has where λ A + (1 − λ) B denotes the Minkowski sum of λ A and (1 − λ) B.
prov:wasDerivedFrom
wikipedia-en:Logarithmically_concave_measure?oldid=1068203245&ns=0
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1863
foaf:isPrimaryTopicOf
wikipedia-en:Logarithmically_concave_measure