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- Hyperfunction abstract "In mathematics, hyperfunctions are generalizations of functions, as a 'jump' from one holomorphic function to another at a boundary, and can be thought of informally as distributions of infinite order. Hyperfunctions were introduced by Mikio Sato in 1958, building upon earlier work by Grothendieck and others. In Japan, it is usually called the Sato's hyperfuncion with the name of M. Sato.".
- Hyperfunction wikiPageID "1678626".
- Hyperfunction wikiPageRevisionID "594657580".
- Hyperfunction hasPhotoCollection Hyperfunction.
- Hyperfunction subject Category:Algebraic_analysis.
- Hyperfunction subject Category:Complex_analysis.
- Hyperfunction subject Category:Generalized_functions.
- Hyperfunction subject Category:Sheaf_theory.
- Hyperfunction type Abstraction100002137.
- Hyperfunction type Function113783816.
- Hyperfunction type GeneralizedFunctions.
- Hyperfunction type MathematicalRelation113783581.
- Hyperfunction type Relation100031921.
- Hyperfunction comment "In mathematics, hyperfunctions are generalizations of functions, as a 'jump' from one holomorphic function to another at a boundary, and can be thought of informally as distributions of infinite order. Hyperfunctions were introduced by Mikio Sato in 1958, building upon earlier work by Grothendieck and others. In Japan, it is usually called the Sato's hyperfuncion with the name of M. Sato.".
- Hyperfunction label "Hyperfonction".
- Hyperfunction label "Hyperfunctie".
- Hyperfunction label "Hyperfunction".
- Hyperfunction label "Hyperfunktion (Mathematik)".
- Hyperfunction label "佐藤超函数".
- Hyperfunction label "超函数".
- Hyperfunction sameAs Hyperfunktion_(Mathematik).
- Hyperfunction sameAs Hyperfonction.
- Hyperfunction sameAs 佐藤超函数.
- Hyperfunction sameAs Hyperfunctie.
- Hyperfunction sameAs m.05mrgt.
- Hyperfunction sameAs Q1567017.
- Hyperfunction sameAs Q1567017.
- Hyperfunction sameAs Hyperfunction.
- Hyperfunction wasDerivedFrom Hyperfunction?oldid=594657580.
- Hyperfunction isPrimaryTopicOf Hyperfunction.