About: Grothendieck inequality

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In mathematics, the Grothendieck inequality states that there is a universal constant with the following property. If Mij is an n × n (real or complex) matrix with for all (real or complex) numbers si, tj of absolute value at most 1, then The Grothendieck inequality and Grothendieck constants are named after Alexander Grothendieck, who proved the existence of the constants in a paper published in 1953.

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rdfs:label	Grothendieck inequality (en) 格羅滕迪克不等式 (zh)
rdfs:comment	格羅滕迪克不等式又稱為安蘇納姆梅·蘿狄絲不等式，是數學中表示兩個量及 , 的關係的不等式，其中是一個希爾伯特空間中的單位球。適合不等式的最佳常數稱為希爾伯特空間的格羅滕迪克常數。證明有一個獨立於的上界：定義格羅滕迪克證明了之後克里維納（Krivine）證出即使對此繼續有研究，到現在還不知道確實數值。 (zh) In mathematics, the Grothendieck inequality states that there is a universal constant with the following property. If Mij is an n × n (real or complex) matrix with for all (real or complex) numbers si, tj of absolute value at most 1, then The Grothendieck inequality and Grothendieck constants are named after Alexander Grothendieck, who proved the existence of the constants in a paper published in 1953. (en)
dcterms:subject	Theorems in functional analysis Inequalities
Wikipage page ID	9395279 (xsd:integer)
Wikipage revision ID	1082271812 (xsd:integer)
Link from a Wikipage to another Wikipage	Boris Tsirelson Bounded sequence Integer programming Interior-point method Limit of a sequence Pseudorandom graph Complex number Theorems in functional analysis Mathematics Matrix (mathematics) Quantum nonlocality Stirling's approximation Clique (graph theory) Measurable function Cauchy–Schwarz inequality Adjacency matrix Alexander Grothendieck Noga Alon Graph theory Graphon Szemerédi regularity lemma Hilbert space Assaf Naor Inequalities Bipartite graph Augmented Lagrangian method Real number NP-hardness Unit ball Pisier–Ringrose inequality Semidefinite programming Vector (mathematics) Bell inequality Lovász theta function Tsirelson bound
sameAs	Grothendieck inequality Grothendieck inequality Grothendieck inequality Grothendieck inequality Grothendieck inequality
dbp:wikiPageUsesTemplate	dbt:Harvtxt dbt:MathWorld dbt:Reflist dbt:Functional_analysis
title	Grothendieck's Constant (en)
urlname	GrothendiecksConstant (en)
has abstract	In mathematics, the Grothendieck inequality states that there is a universal constant with the following property. If Mij is an n × n (real or complex) matrix with for all (real or complex) numbers si, tj of absolute value at most 1, then for all vectors Si, Tj in the unit ball B(H) of a (real or complex) Hilbert space H, the constant being independent of n. For a fixed Hilbert space of dimension d, the smallest constant that satisfies this property for all n × n matrices is called a Grothendieck constant and denoted . In fact, there are two Grothendieck constants, and , depending on whether one works with real or complex numbers, respectively. The Grothendieck inequality and Grothendieck constants are named after Alexander Grothendieck, who proved the existence of the constants in a paper published in 1953. (en) 格羅滕迪克不等式又稱為安蘇納姆梅·蘿狄絲不等式，是數學中表示兩個量及 , 的關係的不等式，其中是一個希爾伯特空間中的單位球。適合不等式的最佳常數稱為希爾伯特空間的格羅滕迪克常數。證明有一個獨立於的上界：定義格羅滕迪克證明了之後克里維納（Krivine）證出即使對此繼續有研究，到現在還不知道確實數值。 (zh)
prov:wasDerivedFrom	wikipedia-en:Grothendieck_inequality?oldid=1082271812&ns=0
page length (characters) of wiki page	28563 (xsd:nonNegativeInteger)
foaf:isPrimaryTopicOf	wikipedia-en:Grothendieck_inequality
is Link from a Wikipage to another Wikipage of	List of inequalities Pseudorandom graph Matrix norm Harry Buhrman Alexander Grothendieck Assaf Naor Shmuel Friedland List of things named after Alexander Grothendieck Littlewood's 4/3 inequality Pisier–Ringrose inequality Grothendieck's constant Grothendieck's inequality Grothendieck constant
is Wikipage redirect of	Grothendieck's constant Grothendieck's inequality Grothendieck constant
is known for of	Harry Buhrman
is foaf:primaryTopic of	wikipedia-en:Grothendieck_inequality

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