Split embedding problems over function fields over complete domains

Elad Paran

doi:10.1353/ajm.0.0075

Split embedding problems over function fields over complete domains

نتاج البحث: نشر في مجلة › مقالة › مراجعة النظراء

ملخص

Let R be a Krull domain, complete with respect to a nonzero ideal. Let K be the quotient field of R. We prove that every finite split embedding problem is solvable over every function field in one variable over K. If dim R > 1, then every finite split embedding problem over K is solvable.

اللغة الأصلية	الإنجليزيّة
الصفحات (من إلى)	1465-1483
عدد الصفحات	19
دورية	American Journal of Mathematics
مستوى الصوت	131
رقم الإصدار	5
المعرِّفات الرقمية للأشياء	https://doi.org/10.1353/ajm.0.0075
حالة النشر	نُشِر - 2009
منشور خارجيًا	نعم

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10.1353/ajm.0.0075

الملفات والروابط الأخرى

Link to publication in Scopus

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title = "Split embedding problems over function fields over complete domains",

abstract = "Let R be a Krull domain, complete with respect to a nonzero ideal. Let K be the quotient field of R. We prove that every finite split embedding problem is solvable over every function field in one variable over K. If dim R > 1, then every finite split embedding problem over K is solvable.",

author = "Elad Paran",

year = "2009",

doi = "10.1353/ajm.0.0075",

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AB - Let R be a Krull domain, complete with respect to a nonzero ideal. Let K be the quotient field of R. We prove that every finite split embedding problem is solvable over every function field in one variable over K. If dim R > 1, then every finite split embedding problem over K is solvable.

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SN - 0002-9327

VL - 131

SP - 1465

EP - 1483

JO - American Journal of Mathematics

JF - American Journal of Mathematics

IS - 5

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Split embedding problems over function fields over complete domains

ملخص

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الملفات والروابط الأخرى

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