Riesz rearrangement inequality mathematics , the Riesz rearrangement inequality functions , and satisfies the inequalitysymmetric decreasing rearrangements of the functions, and respectively.History The inequality was first proved by Frigyes Riesz in 1930 , Sobolev in 1938. It can be generalized to arbitrarily many functions acting on arbitrarily many variables.Applications The Riesz rearrangement inequality can be used to prove the Pólya–Szegő inequality .Proofs In the one-dimensional case, the inequality is first proved when the functions, and are characteristic functions of a finite unions of intervals . Then the inequality can be extended to characteristic functions of measurable sets , to measurable functions taking a finite number of values and finally to nonnegative measurable functions.Higher-dimensional case In order to pass from the one-dimensional case to the higher-dimensional case, the spherical rearrangement is approximated by Steiner symmetrization for which the one-dimensional argument applies directly by Fubini's theorem .In the case where any one of the three functions is a strictly symmetric-decreasing function , equality holds only when the other two functions are equal , up to translation, to their symmetric-decreasing rearrangements.
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