AbstractWe give a result on the André-Quillen homology of an ideal whose first Koszul homology module is free. As application we obtain improvements on well-known results of M. André and T.H. Gulliksen
summary:Given a principal ideal domain $R$ of characteristic zero, containing $1/2$, and a connected...
AbstractIf A is a differential module, then the computation of its homology may frequently be simpli...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
Let (A,M,K) denote a local noetherian ring A with maximal ideal M and residue field K. Let I be an i...
Let (A,M,K) denote a local noetherian ring A with maximal ideal M and residue field K. Let I be an i...
AbstractGiven a commutative Noetherian ring R, there is associated with each homomorphism φ: F → E b...
AbstractSeveral spectral sequence techniques are used in order to derive information about the struc...
AbstractLet (R, m) be a regular local ring, and M an R-module. The minimal free resolution F of M ha...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
AbstractSimis and Vasconcelos [8, and 9] have introduced for any ideal,I, of finite type in a commut...
AbstractWe give a characterization of the acyclicity of the second step of a Tate or simplicial reso...
Let k be a field and R a standard graded k-algebra. We denote by HR the homology algebra of the Kosz...
Let R be a commutative ring and I an ideal in R which is locally generated by a regular sequence of ...
The Koszul homology algebra of a commutative local (or graded) ring R tends to reflect i...
summary:Given a principal ideal domain $R$ of characteristic zero, containing $1/2$, and a connected...
summary:Given a principal ideal domain $R$ of characteristic zero, containing $1/2$, and a connected...
AbstractIf A is a differential module, then the computation of its homology may frequently be simpli...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
Let (A,M,K) denote a local noetherian ring A with maximal ideal M and residue field K. Let I be an i...
Let (A,M,K) denote a local noetherian ring A with maximal ideal M and residue field K. Let I be an i...
AbstractGiven a commutative Noetherian ring R, there is associated with each homomorphism φ: F → E b...
AbstractSeveral spectral sequence techniques are used in order to derive information about the struc...
AbstractLet (R, m) be a regular local ring, and M an R-module. The minimal free resolution F of M ha...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
AbstractSimis and Vasconcelos [8, and 9] have introduced for any ideal,I, of finite type in a commut...
AbstractWe give a characterization of the acyclicity of the second step of a Tate or simplicial reso...
Let k be a field and R a standard graded k-algebra. We denote by HR the homology algebra of the Kosz...
Let R be a commutative ring and I an ideal in R which is locally generated by a regular sequence of ...
The Koszul homology algebra of a commutative local (or graded) ring R tends to reflect i...
summary:Given a principal ideal domain $R$ of characteristic zero, containing $1/2$, and a connected...
summary:Given a principal ideal domain $R$ of characteristic zero, containing $1/2$, and a connected...
AbstractIf A is a differential module, then the computation of its homology may frequently be simpli...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
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