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Statements

Subject Item
dbr:Maximal_function
rdfs:label
Maximal function
rdfs:comment
Maximal functions appear in many forms in harmonic analysis (an area of mathematics). One of the most important of these is the Hardy–Littlewood maximal function. They play an important role in understanding, for example, the differentiability properties of functions, singular integrals and partial differential equations. They often provide a deeper and more simplified approach to understanding problems in these areas than other methods.
dcterms:subject
dbc:Real_analysis
dbo:wikiPageID
16358287
dbo:wikiPageRevisionID
1005233429
dbo:wikiPageWikiLink
dbr:Lebesgue_differentiation_theorem dbr:Martingale_(probability_theory) dbr:Dirac_delta_function dbr:J.E._Littlewood dbr:Harmonic_analysis dbc:Real_analysis dbr:Singular_integrals dbr:Marcinkiewicz_interpolation_theorem dbr:Mathematics dbr:Hardy–Littlewood_maximal_function dbr:G.H._Hardy dbr:Measure_(mathematics) dbr:Vitali_covering_lemma dbr:Cricket dbr:Maximal_ergodic_theorem dbr:Fatou's_theorem dbr:Markov_inequality
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dbo:abstract
Maximal functions appear in many forms in harmonic analysis (an area of mathematics). One of the most important of these is the Hardy–Littlewood maximal function. They play an important role in understanding, for example, the differentiability properties of functions, singular integrals and partial differential equations. They often provide a deeper and more simplified approach to understanding problems in these areas than other methods.
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wikipedia-en:Maximal_function?oldid=1005233429&ns=0
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8772
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wikipedia-en:Maximal_function