Submodules of the Deficiency Modules and an Extension of Dubreil's Theorem

Abstract: In this paper, we consider a basic question in commutative algebra : if I and J are ideals of a commutative ring S, when does IJ l IEJ ? More precisely, our setting will be in a polynomial ring k[x ! , … , x n ], and the ideals I and J will define subschemes of the projective space n k over k. In this situation, we are able to relate the equality of product and intersection to the behavior of the cohomology modules of the subschemes defined by I and J. By doing this, we are able to prove several general algebr… Show more

“…There is an extension of this result to the case of X arithmetically Cohen-Macaulay of codimension two, see [2] or [12]. More recently H. Martin and J. Migliore extended Dubreil's Theorem to X a locally Cohen-Macaulay scheme, see [7,Theorem 2.5]. One of the main points of the present paper is an extension of their result to an arbitrary scheme X ⊂ P n K .…”

Applications of Koszul homology to numbers of generators and syzygies

“…There is an extension of this result to the case of X arithmetically Cohen-Macaulay of codimension two, see [2] or [12]. More recently H. Martin and J. Migliore extended Dubreil's Theorem to X a locally Cohen-Macaulay scheme, see [7,Theorem 2.5]. One of the main points of the present paper is an extension of their result to an arbitrary scheme X ⊂ P n K .…”

Applications of Koszul homology to numbers of generators and syzygies