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N\'{e}ron desingularization of extensions of valuation rings with an Appendix by K\k{e}stutis \v{C}esnavi\v{c}ius - MaRDI portal

N\'{e}ron desingularization of extensions of valuation rings with an Appendix by K\k{e}stutis \v{C}esnavi\v{c}ius

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Publication:6327553

DOI10.1007/978-3-030-84304-5_12arXiv1910.09123MaRDI QIDQ6327553

Dorin Popescu

Publication date: 20 October 2019

Abstract: Zariski's local uniformization, a weak form of resolution of singularities, implies that every valuation ring containing is a filtered direct limit of smooth -algebras. Given an immediate extension of valuation rings VsubsetV containing we show that V is a filtered direct limit of smooth V-algebras. This corrects a paper of us cite{Po1} where we thought that we may reduce to the case when the value groups are finitely generated. For this correction we use an infinite tower of ultrapowers construction that rests on results from model theory. .





Mathematics Subject Classification ID

Singularities in algebraic geometry (14B05) Valuation rings (13F30) Extension theory of commutative rings (13B02) Ultraproducts and related constructions (03C20)








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