PRIMITIVE RECURSIVE DECIDABILITY FOR THE RING OF INTEGERS OF THE COMPOSITUM OF ALL SYMMETRIC EXTENSIONS OF ℚ
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Publication:5858949
DOI10.1017/S001708952000018XzbMath1473.12005OpenAlexW3020822570MaRDI QIDQ5858949
Publication date: 15 April 2021
Published in: Glasgow Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s001708952000018x
Cites Work
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- Every finitely generated regular field extension has a stable transcendence base
- Pseudo algebraically closed fields over rings
- On stabilizers of algebraic function fields of one variable
- Strong approximation theorem for absolutely integral varieties over PSC Galois extensions of global fields
- Algebraic Patching
- Groupes de Picard et problèmes de Skolem. II
- Field Arithmetic
- Elimination theory for the ring of algebraic integers.
- DECIDABLE ALGEBRAIC FIELDS
- STRONG APPROXIMATION THEOREM FOR ABSOLUTELY IRREDUCIBLE VARIETIES OVER THE COMPOSITUM OF ALL SYMMETRIC EXTENSIONS OF A GLOBAL FIELD
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