About: Pseudo algebraically closed field

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In mathematics, a field is pseudo algebraically closed if it satisfies certain properties which hold for algebraically closed fields. The concept was introduced by James Ax in 1967.

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dbo:abstract	Kampo estas pseŭda algebre fermita se unu el jenaj ekvivalentaj kondiĉoj veras: * Ĉiu absolute nereduktebla diversaĵo difinita super havas -racionalan punkton. * Ĉiu absolute nereduktebla polinomo kun kaj por ĉiu tie ekzistas tia ke kaj . * Ĉiu absolute nereduktebla polinoma havas malfinie multajn -. * Se estas finie generita integrala domajno super kun frakcikorpo kiu estas regula super , do tie ekzistas homomorfio tia ke por ĉiu (eo) In mathematics, a field is pseudo algebraically closed if it satisfies certain properties which hold for algebraically closed fields. The concept was introduced by James Ax in 1967. (en)
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rdfs:comment	Kampo estas pseŭda algebre fermita se unu el jenaj ekvivalentaj kondiĉoj veras: * Ĉiu absolute nereduktebla diversaĵo difinita super havas -racionalan punkton. * Ĉiu absolute nereduktebla polinomo kun kaj por ĉiu tie ekzistas tia ke kaj . * Ĉiu absolute nereduktebla polinoma havas malfinie multajn -. * Se estas finie generita integrala domajno super kun frakcikorpo kiu estas regula super , do tie ekzistas homomorfio tia ke por ĉiu (eo) In mathematics, a field is pseudo algebraically closed if it satisfies certain properties which hold for algebraically closed fields. The concept was introduced by James Ax in 1967. (en)
rdfs:label	Pseŭda algebre fermita kampo (eo) Pseudo algebraically closed field (en)
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