Split embedding problems over the open arithmetic disc

Arno Fehm; Elad Paran

doi:10.1090/S0002-9947-2014-05931-X

Split embedding problems over the open arithmetic disc

Arno Fehm
, Elad Paran

מתמטיקה

نتاج البحث: نشر في مجلة › مقالة › مراجعة النظراء

ملخص

Let ℤ{t} be the ring of arithmetic power series that converge on the complex open unit disc. A classical result of Harbater asserts that every finite group occurs as a Galois group over the quotient field of ℤ{t}. We strengthen this by showing that every finite split embedding problem over ℚ acquires a solution over this field. More generally, we solve all t-unramified finite split embedding problems over the quotient field of O_K{t}, where O_Kis the ring of integers of an arbitrary number field K.

اللغة الأصلية	الإنجليزيّة
الصفحات (من إلى)	3535-3551
عدد الصفحات	17
دورية	Transactions of the American Mathematical Society
مستوى الصوت	366
رقم الإصدار	7
المعرِّفات الرقمية للأشياء	https://doi.org/10.1090/S0002-9947-2014-05931-X
حالة النشر	نُشِر - 2014

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Publisher Copyright:
© 2014 American Mathematical Society.

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10.1090/S0002-9947-2014-05931-X

الملفات والروابط الأخرى

Link to publication in Scopus

قم بذكر هذا

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abstract = "Let ℤ\{t\} be the ring of arithmetic power series that converge on the complex open unit disc. A classical result of Harbater asserts that every finite group occurs as a Galois group over the quotient field of ℤ\{t\}. We strengthen this by showing that every finite split embedding problem over ℚ acquires a solution over this field. More generally, we solve all t-unramified finite split embedding problems over the quotient field of OK\{t\}, where OKis the ring of integers of an arbitrary number field K.",

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AU - Fehm, Arno

AU - Paran, Elad

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N2 - Let ℤ{t} be the ring of arithmetic power series that converge on the complex open unit disc. A classical result of Harbater asserts that every finite group occurs as a Galois group over the quotient field of ℤ{t}. We strengthen this by showing that every finite split embedding problem over ℚ acquires a solution over this field. More generally, we solve all t-unramified finite split embedding problems over the quotient field of OK{t}, where OKis the ring of integers of an arbitrary number field K.

AB - Let ℤ{t} be the ring of arithmetic power series that converge on the complex open unit disc. A classical result of Harbater asserts that every finite group occurs as a Galois group over the quotient field of ℤ{t}. We strengthen this by showing that every finite split embedding problem over ℚ acquires a solution over this field. More generally, we solve all t-unramified finite split embedding problems over the quotient field of OK{t}, where OKis the ring of integers of an arbitrary number field K.

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Split embedding problems over the open arithmetic disc

ملخص

ملاحظة ببليوغرافية

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الملفات والروابط الأخرى

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