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- Differentially_closed_field abstract "In mathematics, a differential field K is differentially closed if every finite system of differential equations with a solution in some differential field extending K already has a solution in K. This concept was introduced by Robinson (1959). Differentially closed fields are the analoguesfor differential equations of algebraically closed fields for polynomial equations.".
- Differentially_closed_field wikiPageExternalLink dcf.pdf.
- Differentially_closed_field wikiPageID "10470883".
- Differentially_closed_field wikiPageRevisionID "452845545".
- Differentially_closed_field hasPhotoCollection Differentially_closed_field.
- Differentially_closed_field subject Category:Differential_algebra.
- Differentially_closed_field subject Category:Model_theory.
- Differentially_closed_field comment "In mathematics, a differential field K is differentially closed if every finite system of differential equations with a solution in some differential field extending K already has a solution in K. This concept was introduced by Robinson (1959). Differentially closed fields are the analoguesfor differential equations of algebraically closed fields for polynomial equations.".
- Differentially_closed_field label "Differentially closed field".
- Differentially_closed_field sameAs m.02qf2n_.
- Differentially_closed_field sameAs Q5275375.
- Differentially_closed_field sameAs Q5275375.
- Differentially_closed_field wasDerivedFrom Differentially_closed_field?oldid=452845545.
- Differentially_closed_field isPrimaryTopicOf Differentially_closed_field.