Diagonal Subalgebras of Residual Intersections

Abstract

Let k be a field, S be a bigraded k-algebra, and S denote the diagonal subalgebra of S corresponding to = \ (cs,es) \; | \; s ∈ Z \. It is know that the S is Koszul for c,e 0. In this article, we find bounds for c,e for S to be Koszul, when S is a geometric residual intersection. Furthermore, we also study the Cohen-Macaulay property of these algebras. Finally, as an application, we look at classes of linearly presented perfect ideals of height two in a polynomial ring, show that all their powers have a linear resolution, and study the Koszul, and Cohen-Macaulay property of the diagonal subalgebras of their Rees algebras.