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- Agmon's_inequality abstract "In mathematical analysis, Agmon's inequalities, named after Shmuel Agmon, consist of two closely related interpolation inequalities between the Lebesgue space and the Sobolev spaces . It is useful in the study of partial differential equations. Let where . Then Agmon's inequalities in 3D state that there exists a constant such that and In 2D, the first inequality still holds, but not the second: let where . Then Agmon's inequality in 2D states that there exists a constant such that".
- Agmon's_inequality wikiPageID "20491663".
- Agmon's_inequality wikiPageRevisionID "568231046".
- Agmon's_inequality hasPhotoCollection Agmon's_inequality.
- Agmon's_inequality subject Category:Inequalities.
- Agmon's_inequality subject Category:Mathematical_analysis.
- Agmon's_inequality type Abstraction100002137.
- Agmon's_inequality type Attribute100024264.
- Agmon's_inequality type Difference104748836.
- Agmon's_inequality type Inequalities.
- Agmon's_inequality type Inequality104752221.
- Agmon's_inequality type Quality104723816.
- Agmon's_inequality comment "In mathematical analysis, Agmon's inequalities, named after Shmuel Agmon, consist of two closely related interpolation inequalities between the Lebesgue space and the Sobolev spaces . It is useful in the study of partial differential equations. Let where . Then Agmon's inequalities in 3D state that there exists a constant such that and In 2D, the first inequality still holds, but not the second: let where . Then Agmon's inequality in 2D states that there exists a constant such that".
- Agmon's_inequality label "Agmon's inequality".
- Agmon's_inequality sameAs m.04zzgtf.
- Agmon's_inequality sameAs Q4692965.
- Agmon's_inequality sameAs Q4692965.
- Agmon's_inequality sameAs Agmon's_inequality.
- Agmon's_inequality wasDerivedFrom Agmon's_inequality?oldid=568231046.
- Agmon's_inequality isPrimaryTopicOf Agmon's_inequality.