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In mathematics, the Hausdorff moment problem, named after Felix Hausdorff, asks for necessary and sufficient conditions that a given sequence (m0, m1, m2, ...) be the sequence of moments of some Borel measure μ supported on the closed unit interval [0, 1]. In the case m0 = 1, this is equivalent to the existence of a random variable X supported on [0, 1], such that E[Xn] = mn.

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rdf:type	yago:WikicatMathematicalProblems yago:Abstraction100002137 yago:Attribute100024264 yago:Condition113920835 yago:Difficulty114408086 yago:Problem114410605 yago:State100024720
rdfs:label	Moments de Hausdorff (fr) Hausdorff moment problem (en)
rdfs:comment	In mathematics, the Hausdorff moment problem, named after Felix Hausdorff, asks for necessary and sufficient conditions that a given sequence (m0, m1, m2, ...) be the sequence of moments of some Borel measure μ supported on the closed unit interval [0, 1]. In the case m0 = 1, this is equivalent to the existence of a random variable X supported on [0, 1], such that E[Xn] = mn. (en) En mathématiques, le problème des moments de Hausdorff est celui des conditions nécessaires et suffisantes pour qu'une suite (mn) de réels soit la suite des moments d'une mesure de Borel sur le segment [0, 1]. Le nom du problème est associé au mathématicien allemand Felix Hausdorff. Dans le cas m0 = 1, ceci équivaut à l'existence d'une variable aléatoire réelle X dans l'intervalle [0, 1] telle que pour tout n, l'espérance de Xn soit égale à mn. Il a été étendu aux espaces bidimensionnels et aux suites tronquées. (fr)
dcterms:subject	Mathematical problems Probability problems Moment (mathematics)
Wikipage page ID	3216387 (xsd:integer)
Wikipage revision ID	1016911791 (xsd:integer)
Link from a Wikipage to another Wikipage	Total monotonicity Mathematical problems Mathematics Function (mathematics) Moment (mathematics) James Alexander Shohat Felix Hausdorff Probability problems Moment (mathematics) Random variable Jacob Tamarkin Difference operator Borel measure Sequence Unit interval Support (measure theory) Stieltjes moment problem Lebesgue integral Bounded interval
sameAs	Hausdorff moment problem Hausdorff moment problem Hausdorff moment problem Hausdorff moment problem Hausdorff moment problem
dbp:wikiPageUsesTemplate	dbt:Math dbt:Mvar
has abstract	In mathematics, the Hausdorff moment problem, named after Felix Hausdorff, asks for necessary and sufficient conditions that a given sequence (m0, m1, m2, ...) be the sequence of moments of some Borel measure μ supported on the closed unit interval [0, 1]. In the case m0 = 1, this is equivalent to the existence of a random variable X supported on [0, 1], such that E[Xn] = mn. The essential difference between this and other well-known moment problems is that this is on a bounded interval, whereas in the Stieltjes moment problem one considers a half-line [0, ∞), and in the Hamburger moment problem one considers the whole line (−∞, ∞). The Stieltjes moment problems and the Hamburger moment problems, if they are solvable, may have infinitely many solutions (indeterminate moment problem) whereas a Hausdorff moment problem always has a unique solution if it is solvable (determinate moment problem). In the indeterminate moment problem case, there are infinite measures corresponding to the same prescribed moments and they consist of a convex set. The set of polynomials may or may not be dense in the associated Hilbert spaces if the moment problem is indeterminate, and it depends on whether measure is extremal or not. But in the determinate moment problem case, the set of polynomials is dense in the associated Hilbert space. (en) En mathématiques, le problème des moments de Hausdorff est celui des conditions nécessaires et suffisantes pour qu'une suite (mn) de réels soit la suite des moments d'une mesure de Borel sur le segment [0, 1]. Le nom du problème est associé au mathématicien allemand Felix Hausdorff. Dans le cas m0 = 1, ceci équivaut à l'existence d'une variable aléatoire réelle X dans l'intervalle [0, 1] telle que pour tout n, l'espérance de Xn soit égale à mn. Ce problème est voisin du problème des moments de Stieljes défini sur l'intervalle , celui de Toeplitz sur et celui de Hamburger sur mais à la différence de ceux-ci, la solution, si elle existe, est unique. Il a été étendu aux espaces bidimensionnels et aux suites tronquées. (fr)
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page length (characters) of wiki page	3155 (xsd:nonNegativeInteger)
foaf:isPrimaryTopicOf	wikipedia-en:Hausdorff_moment_problem
is Link from a Wikipage to another Wikipage of	List of probability topics Moment (mathematics) Moment problem Continuous game Bernstein's theorem on monotone functions Hamburger moment problem Felix Hausdorff Catalan number Catalog of articles in probability theory Hausdorff List of statistics articles Complete monotonicity Completely monotone sequence Completely monotonic sequence
is Wikipage redirect of	Complete monotonicity Completely monotone sequence Completely monotonic sequence
is Wikipage disambiguates of	Hausdorff
is known for of	Felix Hausdorff
is known for of	Felix Hausdorff
is foaf:primaryTopic of	wikipedia-en:Hausdorff_moment_problem

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