AbstractFlat morphisms from A to B (commutative and unitary rings) such that the multiplication B⊗AB→B is flat, have many of the properties of ind-etale morphisms. They don't raise weak dimension. As a consequence they preserve integral closure. In the local case they are the extensions of A that have the same strict henselian extensions as A
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
We show that a generalized monoid-ring over a commutative ring is faithfully flat over the base ring...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
AbstractFlat morphisms from A to B (commutative and unitary rings) such that the multiplication B⊗AB...
International audienceLet A -> B be a morphism of Artin local rings with the same embedding dimensio...
Abstract. We prove that if f: (R,m) → (S, n) is a flat local homomorphism, S/mS is Cohen-Macaulay an...
We prove that the weak equivalences, cofibrations and fibrations in Gillespie’s flat model structure...
AbstractAbsolutely integral algebras over a field are the subject of a chapter in Field Theory. They...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
AbstractIn [D. Quillen, On the (co)homology of commutative rings, Proc. Symp. Pure Math. 17 (1970) 6...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
AbstractLet S be a Noetherian scheme and π: X→S be a flat morphism of finite type. Then π is said to...
This note arises from an attempt to give some model-theoretic interpretation of the concept of flatn...
AbstractLet R be a commutative noetherian ring and let I be an ideal of R[x1,…,xn = R [x]. The morph...
AbstractEvery module has a minimal pure injective resolution. For a flat modul over a noetherian rin...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
We show that a generalized monoid-ring over a commutative ring is faithfully flat over the base ring...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
AbstractFlat morphisms from A to B (commutative and unitary rings) such that the multiplication B⊗AB...
International audienceLet A -> B be a morphism of Artin local rings with the same embedding dimensio...
Abstract. We prove that if f: (R,m) → (S, n) is a flat local homomorphism, S/mS is Cohen-Macaulay an...
We prove that the weak equivalences, cofibrations and fibrations in Gillespie’s flat model structure...
AbstractAbsolutely integral algebras over a field are the subject of a chapter in Field Theory. They...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
AbstractIn [D. Quillen, On the (co)homology of commutative rings, Proc. Symp. Pure Math. 17 (1970) 6...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
AbstractLet S be a Noetherian scheme and π: X→S be a flat morphism of finite type. Then π is said to...
This note arises from an attempt to give some model-theoretic interpretation of the concept of flatn...
AbstractLet R be a commutative noetherian ring and let I be an ideal of R[x1,…,xn = R [x]. The morph...
AbstractEvery module has a minimal pure injective resolution. For a flat modul over a noetherian rin...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
We show that a generalized monoid-ring over a commutative ring is faithfully flat over the base ring...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
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