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- Gowers_norm abstract "In mathematics, in the field of additive combinatorics, a Gowers norm or uniformity norm is a class of norm on functions on a finite group or group-like object which are used in the study of arithmetic progressions in the group. It is named after Timothy Gowers, who introduced it in his work on Szemerédi's theorem.".
- Gowers_norm wikiPageExternalLink higher-order-fourier-analysis.
- Gowers_norm wikiPageID "38041703".
- Gowers_norm wikiPageLength "6625".
- Gowers_norm wikiPageOutDegree "8".
- Gowers_norm wikiPageRevisionID "697660135".
- Gowers_norm wikiPageWikiLink American_Mathematical_Society.
- Gowers_norm wikiPageWikiLink Arithmetic_combinatorics.
- Gowers_norm wikiPageWikiLink Category:Additive_combinatorics.
- Gowers_norm wikiPageWikiLink Graduate_Studies_in_Mathematics.
- Gowers_norm wikiPageWikiLink Group_(mathematics).
- Gowers_norm wikiPageWikiLink Norm_(mathematics).
- Gowers_norm wikiPageWikiLink Szemerxc3xa9dis_theorem.
- Gowers_norm wikiPageWikiLink Timothy_Gowers.
- Gowers_norm wikiPageWikiLinkText "Gowers norm".
- Gowers_norm wikiPageUsesTemplate Template:Cite_book.
- Gowers_norm wikiPageUsesTemplate Template:Combin-stub.
- Gowers_norm wikiPageUsesTemplate Template:Redirect.
- Gowers_norm wikiPageUsesTemplate Template:Reflist.
- Gowers_norm subject Category:Additive_combinatorics.
- Gowers_norm hypernym Norm.
- Gowers_norm type Combinatoric.
- Gowers_norm comment "In mathematics, in the field of additive combinatorics, a Gowers norm or uniformity norm is a class of norm on functions on a finite group or group-like object which are used in the study of arithmetic progressions in the group. It is named after Timothy Gowers, who introduced it in his work on Szemerédi's theorem.".
- Gowers_norm label "Gowers norm".
- Gowers_norm sameAs Q5590057.
- Gowers_norm sameAs m.0r3v9mf.
- Gowers_norm sameAs Q5590057.
- Gowers_norm wasDerivedFrom Gowers_norm?oldid=697660135.
- Gowers_norm isPrimaryTopicOf Gowers_norm.