Add to ORKGLet R be an excellent local ring, then there exists a non-negative integer N and a sequence of quadratic transformations R = R(,0) (---\u3e) R(,1) (---\u3e) ... (---\u3e) R(,N) such that R(,i) is residually algebraic over R(,i-1) for 1 (LESSTHEQ) i (LESSTHEQ) N, R(,N) is a Macaulay ring and modulo its nilpotents, R(,N) is a regular local domain
Let k be a field, S = k[xv : v ϵ V] be the polynomial ring over the finite set of variables (xv : v ...
International audienceWe show the Cohen-Macaulayness and describe the canonical module of residual i...
In this article we characterize noetherian local one-dimensional analytically irreducible and residu...
AbstractLet R be a regular noetherian local ring and let V be the ring of a zero-dimensional valuati...
We prove that a quadratic A[T]-module Q with Witt index (Q/TQ)⩾d, where d is the dimension of the eq...
Let R be a regular local ring of dimension d ≥ 2. To a non-divisorial valuation V that dominates R, ...
Given an equicharacteristic complete noetherian local ring R with algebraically closed residue field...
AbstractLet R be a regular noetherian local ring of dimension n≥2 and (Ri)≡R=R0⊂R1⊂R2⊂⋯⊂Ri⊂⋯ be a se...
AbstractIn this paper we prove that if R is a Noetherian local ring and I is an ideal of R, then In ...
O principal objetivo desta dissertação é apresentar resultados centrais sobre derivações localmente ...
The Local Factorization Theorem of Zariski and Abhyankar implies that between a given pair of 2-dime...
Abstract. We investigate some results which concern the types of Noe-therian local rings. In particu...
Let R be a Noetherian local ring. For a reduced R-algebra, one can define an invariant δ R(A) on it....
AbstractThe main purpose of this article in some sense is to illustrate the manner in which the clas...
AbstractLet k be a field, S = k[xv : v ϵ V] be the polynomial ring over the finite set of variables ...
Let k be a field, S = k[xv : v ϵ V] be the polynomial ring over the finite set of variables (xv : v ...
International audienceWe show the Cohen-Macaulayness and describe the canonical module of residual i...
In this article we characterize noetherian local one-dimensional analytically irreducible and residu...
AbstractLet R be a regular noetherian local ring and let V be the ring of a zero-dimensional valuati...
We prove that a quadratic A[T]-module Q with Witt index (Q/TQ)⩾d, where d is the dimension of the eq...
Let R be a regular local ring of dimension d ≥ 2. To a non-divisorial valuation V that dominates R, ...
Given an equicharacteristic complete noetherian local ring R with algebraically closed residue field...
AbstractLet R be a regular noetherian local ring of dimension n≥2 and (Ri)≡R=R0⊂R1⊂R2⊂⋯⊂Ri⊂⋯ be a se...
AbstractIn this paper we prove that if R is a Noetherian local ring and I is an ideal of R, then In ...
O principal objetivo desta dissertação é apresentar resultados centrais sobre derivações localmente ...
The Local Factorization Theorem of Zariski and Abhyankar implies that between a given pair of 2-dime...
Abstract. We investigate some results which concern the types of Noe-therian local rings. In particu...
Let R be a Noetherian local ring. For a reduced R-algebra, one can define an invariant δ R(A) on it....
AbstractThe main purpose of this article in some sense is to illustrate the manner in which the clas...
AbstractLet k be a field, S = k[xv : v ϵ V] be the polynomial ring over the finite set of variables ...
Let k be a field, S = k[xv : v ϵ V] be the polynomial ring over the finite set of variables (xv : v ...
International audienceWe show the Cohen-Macaulayness and describe the canonical module of residual i...
In this article we characterize noetherian local one-dimensional analytically irreducible and residu...