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{{Short description|Mathematical theory by discovered by Józef Marcinkiewicz}}
In [[mathematics]], particularly in [[functional analysis]], the '''Marcinkiewicz interpolation theorem''', discovered by {{harvs|txt|authorlink=Józef Marcinkiewicz|first=Józef |last=Marcinkiewicz|year=1939}}, is a result bounding the norms of non-linear operators acting on [[lp space|''L''<sup>p</sup> spaces]]. Marcinkiewicz' theorem is similar to the [[Riesz–Thorin theorem]] about [[linear operators]], but also applies to non-linear operators.
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:'''Theorem.''' Let ''T'' be a [[bounded linear operator]] from <math>L^p</math> to <math>L^{p,w}</math> and at the same time from <math>L^q</math> to <math>L^{q,w}</math>. Then ''T'' is also a bounded operator from <math>L^r</math> to <math>L^r</math> for any ''r'' between ''p'' and ''q''.
In other words, even if
Where Marcinkiewicz's theorem is weaker than the Riesz-Thorin theorem is in the estimates of the norm. The theorem gives bounds for the <math>L^r</math> norm of ''T'' but this bound increases to infinity as ''r'' converges to either ''p'' or ''q''. Specifically {{harv|DiBenedetto|2002|loc=Theorem VIII.9.2}}, suppose that
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The theorem was first announced by {{harvtxt|Marcinkiewicz|1939}}, who showed this result to [[Antoni Zygmund]] shortly before he died in World War II. The theorem was almost forgotten by Zygmund, and was absent from his original works on the theory of [[singular integral operator]]s. Later {{harvtxt|Zygmund|1956}} realized that Marcinkiewicz's result could greatly simplify his work, at which time he published his former student's theorem together with a generalization of his own.
In 1964 [[Richard Allen Hunt|Richard A. Hunt]] and [[Guido Weiss]] published a new proof of the Marcinkiewicz interpolation theorem.<ref name="HuntWeiss1964">{{cite journal|last1=Hunt|first1=Richard A.|last2=Weiss|first2=Guido|title=The Marcinkiewicz interpolation theorem|journal=Proceedings of the American Mathematical Society|volume=15|issue=6|year=1964|pages=996–998|issn=0002-9939|doi=10.1090/S0002-9939-1964-0169038-4|doi-access=free}}</ref>
== See also ==
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==References==
{{reflist}}
* {{citation | last=DiBenedetto|first=Emmanuele|title=Real analysis|publisher=Birkhäuser|year=2002|isbn=3-7643-4231-5}}.
* {{citation|title=Elliptic partial differential equations of second order|first1=David|last1=Gilbarg|authorlink1=David Gilbarg|first2=Neil S.|last2=Trudinger|authorlink2=Neil Trudinger|publisher=Springer-Verlag|year=2001|isbn=3-540-41160-7| url=https://books.google.com/books
*{{Citation | last1=Marcinkiewicz | first1=J. | title=Sur l'interpolation d'operations | year=1939 |url=https://gallica.bnf.fr/ark:/12148/bpt6k6238835z/f16.item#| journal=C. R. Acad. Sci. Paris | volume=208 | pages=1272–1273}}
* {{citation|title=Introduction to Fourier analysis on Euclidean spaces|first1=Elias|last1=Stein|authorlink1=Elias Stein|first2=Guido|last2=Weiss|publisher=Princeton University Press|year=1971|isbn=0-691-08078-X|url-access=registration|url=https://archive.org/details/introductiontofo0000stei}}.
*{{Citation | last1=Zygmund | first1=A. | title=On a theorem of Marcinkiewicz concerning interpolation of operations |mr=0080887 | year=1956 | journal=[[Journal de Mathématiques Pures et Appliquées]]|series= Neuvième Série | issn=0021-7824 | volume=35 | pages=223–248}}
{{
{{Functional analysis}} [[Category:Fourier analysis]]
[[Category:Theorems in functional analysis]]
[[Category:Lp spaces]]
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