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In mathematics, the Khintchine inequality, named after Aleksandr Khinchin and spelled in multiple ways in the Latin alphabet, is a theorem from probability, and is also frequently used in analysis. Heuristically, it says that if we pick complex numbers , and add them together each multiplied by a random sign , then the expected value of the sum's modulus, or the modulus it will be closest to on average, will be not too far off from .

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  • Chintschin-Ungleichung (de)
  • Khintchine inequality (en)
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  • Die Chintschin-Ungleichung, benannt nach Alexander Jakowlewitsch Chintschin, ist eine Ungleichung aus dem mathematischen Teilgebiet der Funktionalanalysis. Sie vergleicht Summen von Quadraten mit p-Normen zugehöriger Linearkombinationen von Rademacherfunktionen. Nach der französischen Transskiption des Namens Chintschin findet man diese Ungleichung oft unter der Bezeichnung Khintchine-Ungleichung. (de)
  • In mathematics, the Khintchine inequality, named after Aleksandr Khinchin and spelled in multiple ways in the Latin alphabet, is a theorem from probability, and is also frequently used in analysis. Heuristically, it says that if we pick complex numbers , and add them together each multiplied by a random sign , then the expected value of the sum's modulus, or the modulus it will be closest to on average, will be not too far off from . (en)
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  • Die Chintschin-Ungleichung, benannt nach Alexander Jakowlewitsch Chintschin, ist eine Ungleichung aus dem mathematischen Teilgebiet der Funktionalanalysis. Sie vergleicht Summen von Quadraten mit p-Normen zugehöriger Linearkombinationen von Rademacherfunktionen. Nach der französischen Transskiption des Namens Chintschin findet man diese Ungleichung oft unter der Bezeichnung Khintchine-Ungleichung. (de)
  • In mathematics, the Khintchine inequality, named after Aleksandr Khinchin and spelled in multiple ways in the Latin alphabet, is a theorem from probability, and is also frequently used in analysis. Heuristically, it says that if we pick complex numbers , and add them together each multiplied by a random sign , then the expected value of the sum's modulus, or the modulus it will be closest to on average, will be not too far off from . (en)
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